add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
/*
|
|
|
|
* Hierarchical Bitmap Data Type
|
|
|
|
*
|
|
|
|
* Copyright Red Hat, Inc., 2012
|
|
|
|
*
|
|
|
|
* Author: Paolo Bonzini <pbonzini@redhat.com>
|
|
|
|
*
|
|
|
|
* This work is licensed under the terms of the GNU GPL, version 2 or
|
|
|
|
* later. See the COPYING file in the top-level directory.
|
|
|
|
*/
|
|
|
|
|
|
|
|
#include "qemu/osdep.h"
|
|
|
|
#include "qemu/hbitmap.h"
|
|
|
|
#include "qemu/host-utils.h"
|
|
|
|
#include "trace.h"
|
2017-06-28 14:05:25 +02:00
|
|
|
#include "crypto/hash.h"
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
|
|
|
/* HBitmaps provides an array of bits. The bits are stored as usual in an
|
|
|
|
* array of unsigned longs, but HBitmap is also optimized to provide fast
|
|
|
|
* iteration over set bits; going from one bit to the next is O(logB n)
|
|
|
|
* worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
|
|
|
|
* that the number of levels is in fact fixed.
|
|
|
|
*
|
|
|
|
* In order to do this, it stacks multiple bitmaps with progressively coarser
|
|
|
|
* granularity; in all levels except the last, bit N is set iff the N-th
|
|
|
|
* unsigned long is nonzero in the immediately next level. When iteration
|
|
|
|
* completes on the last level it can examine the 2nd-last level to quickly
|
|
|
|
* skip entire words, and even do so recursively to skip blocks of 64 words or
|
|
|
|
* powers thereof (32 on 32-bit machines).
|
|
|
|
*
|
|
|
|
* Given an index in the bitmap, it can be split in group of bits like
|
|
|
|
* this (for the 64-bit case):
|
|
|
|
*
|
|
|
|
* bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
|
|
|
|
* bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
|
|
|
|
* bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
|
|
|
|
*
|
|
|
|
* So it is easy to move up simply by shifting the index right by
|
|
|
|
* log2(BITS_PER_LONG) bits. To move down, you shift the index left
|
|
|
|
* similarly, and add the word index within the group. Iteration uses
|
|
|
|
* ffs (find first set bit) to find the next word to examine; this
|
|
|
|
* operation can be done in constant time in most current architectures.
|
|
|
|
*
|
|
|
|
* Setting or clearing a range of m bits on all levels, the work to perform
|
|
|
|
* is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
|
|
|
|
*
|
|
|
|
* When iterating on a bitmap, each bit (on any level) is only visited
|
|
|
|
* once. Hence, The total cost of visiting a bitmap with m bits in it is
|
|
|
|
* the number of bits that are set in all bitmaps. Unless the bitmap is
|
|
|
|
* extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
|
|
|
|
* cost of advancing from one bit to the next is usually constant (worst case
|
|
|
|
* O(logB n) as in the non-amortized complexity).
|
|
|
|
*/
|
|
|
|
|
|
|
|
struct HBitmap {
|
2019-08-05 14:01:20 +02:00
|
|
|
/*
|
|
|
|
* Size of the bitmap, as requested in hbitmap_alloc or in hbitmap_truncate.
|
|
|
|
*/
|
2019-01-16 00:26:49 +01:00
|
|
|
uint64_t orig_size;
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
/* Number of total bits in the bottom level. */
|
|
|
|
uint64_t size;
|
|
|
|
|
|
|
|
/* Number of set bits in the bottom level. */
|
|
|
|
uint64_t count;
|
|
|
|
|
|
|
|
/* A scaling factor. Given a granularity of G, each bit in the bitmap will
|
|
|
|
* will actually represent a group of 2^G elements. Each operation on a
|
|
|
|
* range of bits first rounds the bits to determine which group they land
|
|
|
|
* in, and then affect the entire page; iteration will only visit the first
|
|
|
|
* bit of each group. Here is an example of operations in a size-16,
|
|
|
|
* granularity-1 HBitmap:
|
|
|
|
*
|
|
|
|
* initial state 00000000
|
|
|
|
* set(start=0, count=9) 11111000 (iter: 0, 2, 4, 6, 8)
|
|
|
|
* reset(start=1, count=3) 00111000 (iter: 4, 6, 8)
|
|
|
|
* set(start=9, count=2) 00111100 (iter: 4, 6, 8, 10)
|
|
|
|
* reset(start=5, count=5) 00000000
|
|
|
|
*
|
|
|
|
* From an implementation point of view, when setting or resetting bits,
|
|
|
|
* the bitmap will scale bit numbers right by this amount of bits. When
|
|
|
|
* iterating, the bitmap will scale bit numbers left by this amount of
|
|
|
|
* bits.
|
|
|
|
*/
|
|
|
|
int granularity;
|
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
/* A meta dirty bitmap to track the dirtiness of bits in this HBitmap. */
|
|
|
|
HBitmap *meta;
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
/* A number of progressively less coarse bitmaps (i.e. level 0 is the
|
|
|
|
* coarsest). Each bit in level N represents a word in level N+1 that
|
|
|
|
* has a set bit, except the last level where each bit represents the
|
|
|
|
* actual bitmap.
|
|
|
|
*
|
|
|
|
* Note that all bitmaps have the same number of levels. Even a 1-bit
|
|
|
|
* bitmap will still allocate HBITMAP_LEVELS arrays.
|
|
|
|
*/
|
|
|
|
unsigned long *levels[HBITMAP_LEVELS];
|
2015-04-18 01:49:54 +02:00
|
|
|
|
|
|
|
/* The length of each levels[] array. */
|
|
|
|
uint64_t sizes[HBITMAP_LEVELS];
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
};
|
|
|
|
|
|
|
|
/* Advance hbi to the next nonzero word and return it. hbi->pos
|
|
|
|
* is updated. Returns zero if we reach the end of the bitmap.
|
|
|
|
*/
|
2020-02-05 12:20:34 +01:00
|
|
|
static unsigned long hbitmap_iter_skip_words(HBitmapIter *hbi)
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
{
|
|
|
|
size_t pos = hbi->pos;
|
|
|
|
const HBitmap *hb = hbi->hb;
|
|
|
|
unsigned i = HBITMAP_LEVELS - 1;
|
|
|
|
|
|
|
|
unsigned long cur;
|
|
|
|
do {
|
2017-06-28 14:05:03 +02:00
|
|
|
i--;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
pos >>= BITS_PER_LEVEL;
|
2017-06-28 14:05:03 +02:00
|
|
|
cur = hbi->cur[i] & hb->levels[i][pos];
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
} while (cur == 0);
|
|
|
|
|
|
|
|
/* Check for end of iteration. We always use fewer than BITS_PER_LONG
|
|
|
|
* bits in the level 0 bitmap; thus we can repurpose the most significant
|
|
|
|
* bit as a sentinel. The sentinel is set in hbitmap_alloc and ensures
|
|
|
|
* that the above loop ends even without an explicit check on i.
|
|
|
|
*/
|
|
|
|
|
|
|
|
if (i == 0 && cur == (1UL << (BITS_PER_LONG - 1))) {
|
|
|
|
return 0;
|
|
|
|
}
|
|
|
|
for (; i < HBITMAP_LEVELS - 1; i++) {
|
|
|
|
/* Shift back pos to the left, matching the right shifts above.
|
|
|
|
* The index of this word's least significant set bit provides
|
|
|
|
* the low-order bits.
|
|
|
|
*/
|
2013-02-14 02:47:36 +01:00
|
|
|
assert(cur);
|
|
|
|
pos = (pos << BITS_PER_LEVEL) + ctzl(cur);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
hbi->cur[i] = cur & (cur - 1);
|
|
|
|
|
|
|
|
/* Set up next level for iteration. */
|
|
|
|
cur = hb->levels[i + 1][pos];
|
|
|
|
}
|
|
|
|
|
|
|
|
hbi->pos = pos;
|
|
|
|
trace_hbitmap_iter_skip_words(hbi->hb, hbi, pos, cur);
|
|
|
|
|
|
|
|
assert(cur);
|
|
|
|
return cur;
|
|
|
|
}
|
|
|
|
|
2019-01-16 00:26:50 +01:00
|
|
|
int64_t hbitmap_iter_next(HBitmapIter *hbi)
|
2017-06-28 14:05:03 +02:00
|
|
|
{
|
|
|
|
unsigned long cur = hbi->cur[HBITMAP_LEVELS - 1] &
|
|
|
|
hbi->hb->levels[HBITMAP_LEVELS - 1][hbi->pos];
|
|
|
|
int64_t item;
|
|
|
|
|
|
|
|
if (cur == 0) {
|
|
|
|
cur = hbitmap_iter_skip_words(hbi);
|
|
|
|
if (cur == 0) {
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
2019-01-16 00:26:50 +01:00
|
|
|
/* The next call will resume work from the next bit. */
|
|
|
|
hbi->cur[HBITMAP_LEVELS - 1] = cur & (cur - 1);
|
2017-06-28 14:05:03 +02:00
|
|
|
item = ((uint64_t)hbi->pos << BITS_PER_LEVEL) + ctzl(cur);
|
|
|
|
|
|
|
|
return item << hbi->granularity;
|
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
void hbitmap_iter_init(HBitmapIter *hbi, const HBitmap *hb, uint64_t first)
|
|
|
|
{
|
|
|
|
unsigned i, bit;
|
|
|
|
uint64_t pos;
|
|
|
|
|
|
|
|
hbi->hb = hb;
|
|
|
|
pos = first >> hb->granularity;
|
2013-01-22 15:01:12 +01:00
|
|
|
assert(pos < hb->size);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
hbi->pos = pos >> BITS_PER_LEVEL;
|
|
|
|
hbi->granularity = hb->granularity;
|
|
|
|
|
|
|
|
for (i = HBITMAP_LEVELS; i-- > 0; ) {
|
|
|
|
bit = pos & (BITS_PER_LONG - 1);
|
|
|
|
pos >>= BITS_PER_LEVEL;
|
|
|
|
|
|
|
|
/* Drop bits representing items before first. */
|
|
|
|
hbi->cur[i] = hb->levels[i][pos] & ~((1UL << bit) - 1);
|
|
|
|
|
|
|
|
/* We have already added level i+1, so the lowest set bit has
|
|
|
|
* been processed. Clear it.
|
|
|
|
*/
|
|
|
|
if (i != HBITMAP_LEVELS - 1) {
|
|
|
|
hbi->cur[i] &= ~(1UL << bit);
|
|
|
|
}
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:37 +01:00
|
|
|
int64_t hbitmap_next_dirty(const HBitmap *hb, int64_t start, int64_t count)
|
|
|
|
{
|
|
|
|
HBitmapIter hbi;
|
|
|
|
int64_t first_dirty_off;
|
|
|
|
uint64_t end;
|
|
|
|
|
|
|
|
assert(start >= 0 && count >= 0);
|
|
|
|
|
|
|
|
if (start >= hb->orig_size || count == 0) {
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
|
|
|
|
end = count > hb->orig_size - start ? hb->orig_size : start + count;
|
|
|
|
|
|
|
|
hbitmap_iter_init(&hbi, hb, start);
|
|
|
|
first_dirty_off = hbitmap_iter_next(&hbi);
|
|
|
|
|
|
|
|
if (first_dirty_off < 0 || first_dirty_off >= end) {
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
|
|
|
|
return MAX(start, first_dirty_off);
|
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:36 +01:00
|
|
|
int64_t hbitmap_next_zero(const HBitmap *hb, int64_t start, int64_t count)
|
2017-10-12 15:53:09 +02:00
|
|
|
{
|
|
|
|
size_t pos = (start >> hb->granularity) >> BITS_PER_LEVEL;
|
|
|
|
unsigned long *last_lev = hb->levels[HBITMAP_LEVELS - 1];
|
|
|
|
unsigned long cur = last_lev[pos];
|
2019-01-16 00:26:49 +01:00
|
|
|
unsigned start_bit_offset;
|
|
|
|
uint64_t end_bit, sz;
|
2017-10-12 15:53:09 +02:00
|
|
|
int64_t res;
|
|
|
|
|
2020-02-05 12:20:36 +01:00
|
|
|
assert(start >= 0 && count >= 0);
|
|
|
|
|
2019-01-16 00:26:49 +01:00
|
|
|
if (start >= hb->orig_size || count == 0) {
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
|
|
|
|
end_bit = count > hb->orig_size - start ?
|
|
|
|
hb->size :
|
|
|
|
((start + count - 1) >> hb->granularity) + 1;
|
|
|
|
sz = (end_bit + BITS_PER_LONG - 1) >> BITS_PER_LEVEL;
|
|
|
|
|
|
|
|
/* There may be some zero bits in @cur before @start. We are not interested
|
|
|
|
* in them, let's set them.
|
|
|
|
*/
|
|
|
|
start_bit_offset = (start >> hb->granularity) & (BITS_PER_LONG - 1);
|
2017-10-12 15:53:09 +02:00
|
|
|
cur |= (1UL << start_bit_offset) - 1;
|
|
|
|
assert((start >> hb->granularity) < hb->size);
|
|
|
|
|
|
|
|
if (cur == (unsigned long)-1) {
|
|
|
|
do {
|
|
|
|
pos++;
|
|
|
|
} while (pos < sz && last_lev[pos] == (unsigned long)-1);
|
|
|
|
|
|
|
|
if (pos >= sz) {
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
|
|
|
|
cur = last_lev[pos];
|
|
|
|
}
|
|
|
|
|
|
|
|
res = (pos << BITS_PER_LEVEL) + ctol(cur);
|
2019-01-16 00:26:49 +01:00
|
|
|
if (res >= end_bit) {
|
2017-10-12 15:53:09 +02:00
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
|
|
|
|
res = res << hb->granularity;
|
|
|
|
if (res < start) {
|
|
|
|
assert(((start - res) >> hb->granularity) == 0);
|
|
|
|
return start;
|
|
|
|
}
|
|
|
|
|
|
|
|
return res;
|
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:38 +01:00
|
|
|
bool hbitmap_next_dirty_area(const HBitmap *hb, int64_t start, int64_t end,
|
|
|
|
int64_t max_dirty_count,
|
|
|
|
int64_t *dirty_start, int64_t *dirty_count)
|
2019-01-16 00:26:50 +01:00
|
|
|
{
|
2020-02-05 12:20:38 +01:00
|
|
|
int64_t next_zero;
|
2020-02-05 12:20:36 +01:00
|
|
|
|
2020-02-05 12:20:38 +01:00
|
|
|
assert(start >= 0 && end >= 0 && max_dirty_count > 0);
|
|
|
|
|
|
|
|
end = MIN(end, hb->orig_size);
|
|
|
|
if (start >= end) {
|
2019-01-16 00:26:50 +01:00
|
|
|
return false;
|
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:38 +01:00
|
|
|
start = hbitmap_next_dirty(hb, start, end - start);
|
|
|
|
if (start < 0) {
|
|
|
|
return false;
|
2019-01-16 00:26:50 +01:00
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:38 +01:00
|
|
|
end = start + MIN(end - start, max_dirty_count);
|
|
|
|
|
|
|
|
next_zero = hbitmap_next_zero(hb, start, end - start);
|
|
|
|
if (next_zero >= 0) {
|
|
|
|
end = next_zero;
|
|
|
|
}
|
|
|
|
|
|
|
|
*dirty_start = start;
|
|
|
|
*dirty_count = end - start;
|
2019-01-16 00:26:50 +01:00
|
|
|
|
|
|
|
return true;
|
|
|
|
}
|
|
|
|
|
2022-03-03 20:43:41 +01:00
|
|
|
bool hbitmap_status(const HBitmap *hb, int64_t start, int64_t count,
|
|
|
|
int64_t *pnum)
|
|
|
|
{
|
|
|
|
int64_t next_dirty, next_zero;
|
|
|
|
|
|
|
|
assert(start >= 0);
|
|
|
|
assert(count > 0);
|
|
|
|
assert(start + count <= hb->orig_size);
|
|
|
|
|
|
|
|
next_dirty = hbitmap_next_dirty(hb, start, count);
|
|
|
|
if (next_dirty == -1) {
|
|
|
|
*pnum = count;
|
|
|
|
return false;
|
|
|
|
}
|
|
|
|
|
|
|
|
if (next_dirty > start) {
|
|
|
|
*pnum = next_dirty - start;
|
|
|
|
return false;
|
|
|
|
}
|
|
|
|
|
|
|
|
assert(next_dirty == start);
|
|
|
|
|
|
|
|
next_zero = hbitmap_next_zero(hb, start, count);
|
|
|
|
if (next_zero == -1) {
|
|
|
|
*pnum = count;
|
|
|
|
return true;
|
|
|
|
}
|
|
|
|
|
|
|
|
assert(next_zero > start);
|
|
|
|
*pnum = next_zero - start;
|
2023-02-02 19:15:23 +01:00
|
|
|
return true;
|
2022-03-03 20:43:41 +01:00
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
bool hbitmap_empty(const HBitmap *hb)
|
|
|
|
{
|
|
|
|
return hb->count == 0;
|
|
|
|
}
|
|
|
|
|
|
|
|
int hbitmap_granularity(const HBitmap *hb)
|
|
|
|
{
|
|
|
|
return hb->granularity;
|
|
|
|
}
|
|
|
|
|
|
|
|
uint64_t hbitmap_count(const HBitmap *hb)
|
|
|
|
{
|
|
|
|
return hb->count << hb->granularity;
|
|
|
|
}
|
|
|
|
|
2020-02-05 12:20:33 +01:00
|
|
|
/**
|
|
|
|
* hbitmap_iter_next_word:
|
|
|
|
* @hbi: HBitmapIter to operate on.
|
|
|
|
* @p_cur: Location where to store the next non-zero word.
|
|
|
|
*
|
|
|
|
* Return the index of the next nonzero word that is set in @hbi's
|
|
|
|
* associated HBitmap, and set *p_cur to the content of that word
|
|
|
|
* (bits before the index that was passed to hbitmap_iter_init are
|
|
|
|
* trimmed on the first call). Return -1, and set *p_cur to zero,
|
|
|
|
* if all remaining words are zero.
|
|
|
|
*/
|
|
|
|
static size_t hbitmap_iter_next_word(HBitmapIter *hbi, unsigned long *p_cur)
|
|
|
|
{
|
|
|
|
unsigned long cur = hbi->cur[HBITMAP_LEVELS - 1];
|
|
|
|
|
|
|
|
if (cur == 0) {
|
|
|
|
cur = hbitmap_iter_skip_words(hbi);
|
|
|
|
if (cur == 0) {
|
|
|
|
*p_cur = 0;
|
|
|
|
return -1;
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
|
|
|
/* The next call will resume work from the next word. */
|
|
|
|
hbi->cur[HBITMAP_LEVELS - 1] = 0;
|
|
|
|
*p_cur = cur;
|
|
|
|
return hbi->pos;
|
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
/* Count the number of set bits between start and end, not accounting for
|
|
|
|
* the granularity. Also an example of how to use hbitmap_iter_next_word.
|
|
|
|
*/
|
|
|
|
static uint64_t hb_count_between(HBitmap *hb, uint64_t start, uint64_t last)
|
|
|
|
{
|
|
|
|
HBitmapIter hbi;
|
|
|
|
uint64_t count = 0;
|
|
|
|
uint64_t end = last + 1;
|
|
|
|
unsigned long cur;
|
|
|
|
size_t pos;
|
|
|
|
|
|
|
|
hbitmap_iter_init(&hbi, hb, start << hb->granularity);
|
|
|
|
for (;;) {
|
|
|
|
pos = hbitmap_iter_next_word(&hbi, &cur);
|
|
|
|
if (pos >= (end >> BITS_PER_LEVEL)) {
|
|
|
|
break;
|
|
|
|
}
|
2014-06-04 01:07:20 +02:00
|
|
|
count += ctpopl(cur);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
if (pos == (end >> BITS_PER_LEVEL)) {
|
|
|
|
/* Drop bits representing the END-th and subsequent items. */
|
|
|
|
int bit = end & (BITS_PER_LONG - 1);
|
|
|
|
cur &= (1UL << bit) - 1;
|
2014-06-04 01:07:20 +02:00
|
|
|
count += ctpopl(cur);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
return count;
|
|
|
|
}
|
|
|
|
|
|
|
|
/* Setting starts at the last layer and propagates up if an element
|
2016-10-13 23:58:22 +02:00
|
|
|
* changes.
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
*/
|
|
|
|
static inline bool hb_set_elem(unsigned long *elem, uint64_t start, uint64_t last)
|
|
|
|
{
|
|
|
|
unsigned long mask;
|
2016-10-13 23:58:22 +02:00
|
|
|
unsigned long old;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
|
|
|
assert((last >> BITS_PER_LEVEL) == (start >> BITS_PER_LEVEL));
|
|
|
|
assert(start <= last);
|
|
|
|
|
|
|
|
mask = 2UL << (last & (BITS_PER_LONG - 1));
|
|
|
|
mask -= 1UL << (start & (BITS_PER_LONG - 1));
|
2016-10-13 23:58:22 +02:00
|
|
|
old = *elem;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
*elem |= mask;
|
2016-10-13 23:58:22 +02:00
|
|
|
return old != *elem;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
/* The recursive workhorse (the depth is limited to HBITMAP_LEVELS)...
|
|
|
|
* Returns true if at least one bit is changed. */
|
|
|
|
static bool hb_set_between(HBitmap *hb, int level, uint64_t start,
|
|
|
|
uint64_t last)
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
{
|
|
|
|
size_t pos = start >> BITS_PER_LEVEL;
|
|
|
|
size_t lastpos = last >> BITS_PER_LEVEL;
|
|
|
|
bool changed = false;
|
|
|
|
size_t i;
|
|
|
|
|
|
|
|
i = pos;
|
|
|
|
if (i < lastpos) {
|
|
|
|
uint64_t next = (start | (BITS_PER_LONG - 1)) + 1;
|
|
|
|
changed |= hb_set_elem(&hb->levels[level][i], start, next - 1);
|
|
|
|
for (;;) {
|
|
|
|
start = next;
|
|
|
|
next += BITS_PER_LONG;
|
|
|
|
if (++i == lastpos) {
|
|
|
|
break;
|
|
|
|
}
|
|
|
|
changed |= (hb->levels[level][i] == 0);
|
|
|
|
hb->levels[level][i] = ~0UL;
|
|
|
|
}
|
|
|
|
}
|
|
|
|
changed |= hb_set_elem(&hb->levels[level][i], start, last);
|
|
|
|
|
|
|
|
/* If there was any change in this layer, we may have to update
|
|
|
|
* the one above.
|
|
|
|
*/
|
|
|
|
if (level > 0 && changed) {
|
|
|
|
hb_set_between(hb, level - 1, pos, lastpos);
|
|
|
|
}
|
2016-10-13 23:58:22 +02:00
|
|
|
return changed;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
void hbitmap_set(HBitmap *hb, uint64_t start, uint64_t count)
|
|
|
|
{
|
|
|
|
/* Compute range in the last layer. */
|
2016-10-13 23:58:22 +02:00
|
|
|
uint64_t first, n;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
uint64_t last = start + count - 1;
|
|
|
|
|
2019-10-11 11:07:07 +02:00
|
|
|
if (count == 0) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
trace_hbitmap_set(hb, start, count,
|
|
|
|
start >> hb->granularity, last >> hb->granularity);
|
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
first = start >> hb->granularity;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
last >>= hb->granularity;
|
2016-06-14 19:08:12 +02:00
|
|
|
assert(last < hb->size);
|
2016-10-13 23:58:22 +02:00
|
|
|
n = last - first + 1;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
hb->count += n - hb_count_between(hb, first, last);
|
|
|
|
if (hb_set_between(hb, HBITMAP_LEVELS - 1, first, last) &&
|
|
|
|
hb->meta) {
|
|
|
|
hbitmap_set(hb->meta, start, count);
|
|
|
|
}
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
/* Resetting works the other way round: propagate up if the new
|
|
|
|
* value is zero.
|
|
|
|
*/
|
|
|
|
static inline bool hb_reset_elem(unsigned long *elem, uint64_t start, uint64_t last)
|
|
|
|
{
|
|
|
|
unsigned long mask;
|
|
|
|
bool blanked;
|
|
|
|
|
|
|
|
assert((last >> BITS_PER_LEVEL) == (start >> BITS_PER_LEVEL));
|
|
|
|
assert(start <= last);
|
|
|
|
|
|
|
|
mask = 2UL << (last & (BITS_PER_LONG - 1));
|
|
|
|
mask -= 1UL << (start & (BITS_PER_LONG - 1));
|
|
|
|
blanked = *elem != 0 && ((*elem & ~mask) == 0);
|
|
|
|
*elem &= ~mask;
|
|
|
|
return blanked;
|
|
|
|
}
|
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
/* The recursive workhorse (the depth is limited to HBITMAP_LEVELS)...
|
|
|
|
* Returns true if at least one bit is changed. */
|
|
|
|
static bool hb_reset_between(HBitmap *hb, int level, uint64_t start,
|
|
|
|
uint64_t last)
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
{
|
|
|
|
size_t pos = start >> BITS_PER_LEVEL;
|
|
|
|
size_t lastpos = last >> BITS_PER_LEVEL;
|
|
|
|
bool changed = false;
|
|
|
|
size_t i;
|
|
|
|
|
|
|
|
i = pos;
|
|
|
|
if (i < lastpos) {
|
|
|
|
uint64_t next = (start | (BITS_PER_LONG - 1)) + 1;
|
|
|
|
|
|
|
|
/* Here we need a more complex test than when setting bits. Even if
|
|
|
|
* something was changed, we must not blank bits in the upper level
|
|
|
|
* unless the lower-level word became entirely zero. So, remove pos
|
|
|
|
* from the upper-level range if bits remain set.
|
|
|
|
*/
|
|
|
|
if (hb_reset_elem(&hb->levels[level][i], start, next - 1)) {
|
|
|
|
changed = true;
|
|
|
|
} else {
|
|
|
|
pos++;
|
|
|
|
}
|
|
|
|
|
|
|
|
for (;;) {
|
|
|
|
start = next;
|
|
|
|
next += BITS_PER_LONG;
|
|
|
|
if (++i == lastpos) {
|
|
|
|
break;
|
|
|
|
}
|
|
|
|
changed |= (hb->levels[level][i] != 0);
|
|
|
|
hb->levels[level][i] = 0UL;
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
|
|
|
/* Same as above, this time for lastpos. */
|
|
|
|
if (hb_reset_elem(&hb->levels[level][i], start, last)) {
|
|
|
|
changed = true;
|
|
|
|
} else {
|
|
|
|
lastpos--;
|
|
|
|
}
|
|
|
|
|
|
|
|
if (level > 0 && changed) {
|
|
|
|
hb_reset_between(hb, level - 1, pos, lastpos);
|
|
|
|
}
|
2016-10-13 23:58:22 +02:00
|
|
|
|
|
|
|
return changed;
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
void hbitmap_reset(HBitmap *hb, uint64_t start, uint64_t count)
|
|
|
|
{
|
|
|
|
/* Compute range in the last layer. */
|
2016-10-13 23:58:22 +02:00
|
|
|
uint64_t first;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
uint64_t last = start + count - 1;
|
2019-08-06 17:26:11 +02:00
|
|
|
uint64_t gran = 1ULL << hb->granularity;
|
|
|
|
|
2019-10-11 11:07:07 +02:00
|
|
|
if (count == 0) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
|
2019-08-06 17:26:11 +02:00
|
|
|
assert(QEMU_IS_ALIGNED(start, gran));
|
|
|
|
assert(QEMU_IS_ALIGNED(count, gran) || (start + count == hb->orig_size));
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
|
|
|
trace_hbitmap_reset(hb, start, count,
|
|
|
|
start >> hb->granularity, last >> hb->granularity);
|
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
first = start >> hb->granularity;
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
last >>= hb->granularity;
|
2016-06-14 19:08:12 +02:00
|
|
|
assert(last < hb->size);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
2016-10-13 23:58:22 +02:00
|
|
|
hb->count -= hb_count_between(hb, first, last);
|
|
|
|
if (hb_reset_between(hb, HBITMAP_LEVELS - 1, first, last) &&
|
|
|
|
hb->meta) {
|
|
|
|
hbitmap_set(hb->meta, start, count);
|
|
|
|
}
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
2015-05-22 03:29:46 +02:00
|
|
|
void hbitmap_reset_all(HBitmap *hb)
|
|
|
|
{
|
|
|
|
unsigned int i;
|
|
|
|
|
|
|
|
/* Same as hbitmap_alloc() except for memset() instead of malloc() */
|
|
|
|
for (i = HBITMAP_LEVELS; --i >= 1; ) {
|
|
|
|
memset(hb->levels[i], 0, hb->sizes[i] * sizeof(unsigned long));
|
|
|
|
}
|
|
|
|
|
|
|
|
hb->levels[0][0] = 1UL << (BITS_PER_LONG - 1);
|
|
|
|
hb->count = 0;
|
|
|
|
}
|
|
|
|
|
2016-11-15 23:57:45 +01:00
|
|
|
bool hbitmap_is_serializable(const HBitmap *hb)
|
|
|
|
{
|
|
|
|
/* Every serialized chunk must be aligned to 64 bits so that endianness
|
|
|
|
* requirements can be fulfilled on both 64 bit and 32 bit hosts.
|
2017-09-25 16:55:08 +02:00
|
|
|
* We have hbitmap_serialization_align() which converts this
|
2016-11-15 23:57:45 +01:00
|
|
|
* alignment requirement from bitmap bits to items covered (e.g. sectors).
|
|
|
|
* That value is:
|
|
|
|
* 64 << hb->granularity
|
|
|
|
* Since this value must not exceed UINT64_MAX, hb->granularity must be
|
|
|
|
* less than 58 (== 64 - 6, where 6 is ld(64), i.e. 1 << 6 == 64).
|
|
|
|
*
|
2017-09-25 16:55:08 +02:00
|
|
|
* In order for hbitmap_serialization_align() to always return a
|
2016-11-15 23:57:45 +01:00
|
|
|
* meaningful value, bitmaps that are to be serialized must have a
|
|
|
|
* granularity of less than 58. */
|
|
|
|
|
|
|
|
return hb->granularity < 58;
|
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
bool hbitmap_get(const HBitmap *hb, uint64_t item)
|
|
|
|
{
|
|
|
|
/* Compute position and bit in the last layer. */
|
|
|
|
uint64_t pos = item >> hb->granularity;
|
|
|
|
unsigned long bit = 1UL << (pos & (BITS_PER_LONG - 1));
|
2016-06-14 19:08:12 +02:00
|
|
|
assert(pos < hb->size);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
|
|
|
|
return (hb->levels[HBITMAP_LEVELS - 1][pos >> BITS_PER_LEVEL] & bit) != 0;
|
|
|
|
}
|
|
|
|
|
2017-09-25 16:55:08 +02:00
|
|
|
uint64_t hbitmap_serialization_align(const HBitmap *hb)
|
2016-10-13 23:58:27 +02:00
|
|
|
{
|
2016-11-15 23:57:45 +01:00
|
|
|
assert(hbitmap_is_serializable(hb));
|
2016-11-15 23:47:32 +01:00
|
|
|
|
2016-10-13 23:58:27 +02:00
|
|
|
/* Require at least 64 bit granularity to be safe on both 64 bit and 32 bit
|
|
|
|
* hosts. */
|
2016-11-15 23:47:32 +01:00
|
|
|
return UINT64_C(64) << hb->granularity;
|
2016-10-13 23:58:27 +02:00
|
|
|
}
|
|
|
|
|
|
|
|
/* Start should be aligned to serialization granularity, chunk size should be
|
|
|
|
* aligned to serialization granularity too, except for last chunk.
|
|
|
|
*/
|
|
|
|
static void serialization_chunk(const HBitmap *hb,
|
|
|
|
uint64_t start, uint64_t count,
|
|
|
|
unsigned long **first_el, uint64_t *el_count)
|
|
|
|
{
|
|
|
|
uint64_t last = start + count - 1;
|
2017-09-25 16:55:08 +02:00
|
|
|
uint64_t gran = hbitmap_serialization_align(hb);
|
2016-10-13 23:58:27 +02:00
|
|
|
|
|
|
|
assert((start & (gran - 1)) == 0);
|
|
|
|
assert((last >> hb->granularity) < hb->size);
|
|
|
|
if ((last >> hb->granularity) != hb->size - 1) {
|
|
|
|
assert((count & (gran - 1)) == 0);
|
|
|
|
}
|
|
|
|
|
|
|
|
start = (start >> hb->granularity) >> BITS_PER_LEVEL;
|
|
|
|
last = (last >> hb->granularity) >> BITS_PER_LEVEL;
|
|
|
|
|
|
|
|
*first_el = &hb->levels[HBITMAP_LEVELS - 1][start];
|
|
|
|
*el_count = last - start + 1;
|
|
|
|
}
|
|
|
|
|
|
|
|
uint64_t hbitmap_serialization_size(const HBitmap *hb,
|
|
|
|
uint64_t start, uint64_t count)
|
|
|
|
{
|
|
|
|
uint64_t el_count;
|
|
|
|
unsigned long *cur;
|
|
|
|
|
|
|
|
if (!count) {
|
|
|
|
return 0;
|
|
|
|
}
|
|
|
|
serialization_chunk(hb, start, count, &cur, &el_count);
|
|
|
|
|
|
|
|
return el_count * sizeof(unsigned long);
|
|
|
|
}
|
|
|
|
|
|
|
|
void hbitmap_serialize_part(const HBitmap *hb, uint8_t *buf,
|
|
|
|
uint64_t start, uint64_t count)
|
|
|
|
{
|
|
|
|
uint64_t el_count;
|
|
|
|
unsigned long *cur, *end;
|
|
|
|
|
|
|
|
if (!count) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
serialization_chunk(hb, start, count, &cur, &el_count);
|
|
|
|
end = cur + el_count;
|
|
|
|
|
|
|
|
while (cur != end) {
|
|
|
|
unsigned long el =
|
|
|
|
(BITS_PER_LONG == 32 ? cpu_to_le32(*cur) : cpu_to_le64(*cur));
|
|
|
|
|
|
|
|
memcpy(buf, &el, sizeof(el));
|
|
|
|
buf += sizeof(el);
|
|
|
|
cur++;
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
|
|
|
void hbitmap_deserialize_part(HBitmap *hb, uint8_t *buf,
|
|
|
|
uint64_t start, uint64_t count,
|
|
|
|
bool finish)
|
|
|
|
{
|
|
|
|
uint64_t el_count;
|
|
|
|
unsigned long *cur, *end;
|
|
|
|
|
|
|
|
if (!count) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
serialization_chunk(hb, start, count, &cur, &el_count);
|
|
|
|
end = cur + el_count;
|
|
|
|
|
|
|
|
while (cur != end) {
|
|
|
|
memcpy(cur, buf, sizeof(*cur));
|
|
|
|
|
|
|
|
if (BITS_PER_LONG == 32) {
|
|
|
|
le32_to_cpus((uint32_t *)cur);
|
|
|
|
} else {
|
|
|
|
le64_to_cpus((uint64_t *)cur);
|
|
|
|
}
|
|
|
|
|
|
|
|
buf += sizeof(unsigned long);
|
|
|
|
cur++;
|
|
|
|
}
|
|
|
|
if (finish) {
|
|
|
|
hbitmap_deserialize_finish(hb);
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
|
|
|
void hbitmap_deserialize_zeroes(HBitmap *hb, uint64_t start, uint64_t count,
|
|
|
|
bool finish)
|
|
|
|
{
|
|
|
|
uint64_t el_count;
|
|
|
|
unsigned long *first;
|
|
|
|
|
|
|
|
if (!count) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
serialization_chunk(hb, start, count, &first, &el_count);
|
|
|
|
|
|
|
|
memset(first, 0, el_count * sizeof(unsigned long));
|
|
|
|
if (finish) {
|
|
|
|
hbitmap_deserialize_finish(hb);
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
2017-06-28 14:05:06 +02:00
|
|
|
void hbitmap_deserialize_ones(HBitmap *hb, uint64_t start, uint64_t count,
|
|
|
|
bool finish)
|
|
|
|
{
|
|
|
|
uint64_t el_count;
|
|
|
|
unsigned long *first;
|
|
|
|
|
|
|
|
if (!count) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
serialization_chunk(hb, start, count, &first, &el_count);
|
|
|
|
|
|
|
|
memset(first, 0xff, el_count * sizeof(unsigned long));
|
|
|
|
if (finish) {
|
|
|
|
hbitmap_deserialize_finish(hb);
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
2016-10-13 23:58:27 +02:00
|
|
|
void hbitmap_deserialize_finish(HBitmap *bitmap)
|
|
|
|
{
|
|
|
|
int64_t i, size, prev_size;
|
|
|
|
int lev;
|
|
|
|
|
|
|
|
/* restore levels starting from penultimate to zero level, assuming
|
|
|
|
* that the last level is ok */
|
|
|
|
size = MAX((bitmap->size + BITS_PER_LONG - 1) >> BITS_PER_LEVEL, 1);
|
|
|
|
for (lev = HBITMAP_LEVELS - 1; lev-- > 0; ) {
|
|
|
|
prev_size = size;
|
|
|
|
size = MAX((size + BITS_PER_LONG - 1) >> BITS_PER_LEVEL, 1);
|
|
|
|
memset(bitmap->levels[lev], 0, size * sizeof(unsigned long));
|
|
|
|
|
|
|
|
for (i = 0; i < prev_size; ++i) {
|
|
|
|
if (bitmap->levels[lev + 1][i]) {
|
|
|
|
bitmap->levels[lev][i >> BITS_PER_LEVEL] |=
|
|
|
|
1UL << (i & (BITS_PER_LONG - 1));
|
|
|
|
}
|
|
|
|
}
|
|
|
|
}
|
|
|
|
|
|
|
|
bitmap->levels[0][0] |= 1UL << (BITS_PER_LONG - 1);
|
2018-02-07 17:35:49 +01:00
|
|
|
bitmap->count = hb_count_between(bitmap, 0, bitmap->size - 1);
|
2016-10-13 23:58:27 +02:00
|
|
|
}
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
void hbitmap_free(HBitmap *hb)
|
|
|
|
{
|
|
|
|
unsigned i;
|
2016-10-13 23:58:22 +02:00
|
|
|
assert(!hb->meta);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
for (i = HBITMAP_LEVELS; i-- > 0; ) {
|
|
|
|
g_free(hb->levels[i]);
|
|
|
|
}
|
|
|
|
g_free(hb);
|
|
|
|
}
|
|
|
|
|
|
|
|
HBitmap *hbitmap_alloc(uint64_t size, int granularity)
|
|
|
|
{
|
2014-12-04 15:00:03 +01:00
|
|
|
HBitmap *hb = g_new0(struct HBitmap, 1);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
unsigned i;
|
|
|
|
|
2020-02-05 12:20:32 +01:00
|
|
|
assert(size <= INT64_MAX);
|
2019-01-16 00:26:49 +01:00
|
|
|
hb->orig_size = size;
|
|
|
|
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
assert(granularity >= 0 && granularity < 64);
|
|
|
|
size = (size + (1ULL << granularity) - 1) >> granularity;
|
|
|
|
assert(size <= ((uint64_t)1 << HBITMAP_LOG_MAX_SIZE));
|
|
|
|
|
|
|
|
hb->size = size;
|
|
|
|
hb->granularity = granularity;
|
|
|
|
for (i = HBITMAP_LEVELS; i-- > 0; ) {
|
|
|
|
size = MAX((size + BITS_PER_LONG - 1) >> BITS_PER_LEVEL, 1);
|
2015-04-18 01:49:54 +02:00
|
|
|
hb->sizes[i] = size;
|
2014-12-04 15:00:03 +01:00
|
|
|
hb->levels[i] = g_new0(unsigned long, size);
|
add hierarchical bitmap data type and test cases
HBitmaps provides an array of bits. The bits are stored as usual in an
array of unsigned longs, but HBitmap is also optimized to provide fast
iteration over set bits; going from one bit to the next is O(logB n)
worst case, with B = sizeof(long) * CHAR_BIT: the result is low enough
that the number of levels is in fact fixed.
In order to do this, it stacks multiple bitmaps with progressively coarser
granularity; in all levels except the last, bit N is set iff the N-th
unsigned long is nonzero in the immediately next level. When iteration
completes on the last level it can examine the 2nd-last level to quickly
skip entire words, and even do so recursively to skip blocks of 64 words or
powers thereof (32 on 32-bit machines).
Given an index in the bitmap, it can be split in group of bits like
this (for the 64-bit case):
bits 0-57 => word in the last bitmap | bits 58-63 => bit in the word
bits 0-51 => word in the 2nd-last bitmap | bits 52-57 => bit in the word
bits 0-45 => word in the 3rd-last bitmap | bits 46-51 => bit in the word
So it is easy to move up simply by shifting the index right by
log2(BITS_PER_LONG) bits. To move down, you shift the index left
similarly, and add the word index within the group. Iteration uses
ffs (find first set bit) to find the next word to examine; this
operation can be done in constant time in most current architectures.
Setting or clearing a range of m bits on all levels, the work to perform
is O(m + m/W + m/W^2 + ...), which is O(m) like on a regular bitmap.
When iterating on a bitmap, each bit (on any level) is only visited
once. Hence, The total cost of visiting a bitmap with m bits in it is
the number of bits that are set in all bitmaps. Unless the bitmap is
extremely sparse, this is also O(m + m/W + m/W^2 + ...), so the amortized
cost of advancing from one bit to the next is usually constant.
Reviewed-by: Laszlo Ersek <lersek@redhat.com>
Reviewed-by: Eric Blake <eblake@redhat.com>
Signed-off-by: Paolo Bonzini <pbonzini@redhat.com>
Signed-off-by: Kevin Wolf <kwolf@redhat.com>
2013-01-21 17:09:40 +01:00
|
|
|
}
|
|
|
|
|
|
|
|
/* We necessarily have free bits in level 0 due to the definition
|
|
|
|
* of HBITMAP_LEVELS, so use one for a sentinel. This speeds up
|
|
|
|
* hbitmap_iter_skip_words.
|
|
|
|
*/
|
|
|
|
assert(size == 1);
|
|
|
|
hb->levels[0][0] |= 1UL << (BITS_PER_LONG - 1);
|
|
|
|
return hb;
|
|
|
|
}
|
2015-04-18 01:49:55 +02:00
|
|
|
|
2015-04-18 01:50:03 +02:00
|
|
|
void hbitmap_truncate(HBitmap *hb, uint64_t size)
|
|
|
|
{
|
|
|
|
bool shrink;
|
|
|
|
unsigned i;
|
|
|
|
uint64_t num_elements = size;
|
|
|
|
uint64_t old;
|
|
|
|
|
2020-02-05 12:20:32 +01:00
|
|
|
assert(size <= INT64_MAX);
|
2019-08-05 14:01:20 +02:00
|
|
|
hb->orig_size = size;
|
|
|
|
|
2015-04-18 01:50:03 +02:00
|
|
|
/* Size comes in as logical elements, adjust for granularity. */
|
|
|
|
size = (size + (1ULL << hb->granularity) - 1) >> hb->granularity;
|
|
|
|
assert(size <= ((uint64_t)1 << HBITMAP_LOG_MAX_SIZE));
|
|
|
|
shrink = size < hb->size;
|
|
|
|
|
|
|
|
/* bit sizes are identical; nothing to do. */
|
|
|
|
if (size == hb->size) {
|
|
|
|
return;
|
|
|
|
}
|
|
|
|
|
|
|
|
/* If we're losing bits, let's clear those bits before we invalidate all of
|
|
|
|
* our invariants. This helps keep the bitcount consistent, and will prevent
|
|
|
|
* us from carrying around garbage bits beyond the end of the map.
|
|
|
|
*/
|
|
|
|
if (shrink) {
|
|
|
|
/* Don't clear partial granularity groups;
|
|
|
|
* start at the first full one. */
|
2016-11-15 23:47:32 +01:00
|
|
|
uint64_t start = ROUND_UP(num_elements, UINT64_C(1) << hb->granularity);
|
2015-04-18 01:50:03 +02:00
|
|
|
uint64_t fix_count = (hb->size << hb->granularity) - start;
|
|
|
|
|
|
|
|
assert(fix_count);
|
|
|
|
hbitmap_reset(hb, start, fix_count);
|
|
|
|
}
|
|
|
|
|
|
|
|
hb->size = size;
|
|
|
|
for (i = HBITMAP_LEVELS; i-- > 0; ) {
|
|
|
|
size = MAX(BITS_TO_LONGS(size), 1);
|
|
|
|
if (hb->sizes[i] == size) {
|
|
|
|
break;
|
|
|
|
}
|
|
|
|
old = hb->sizes[i];
|
|
|
|
hb->sizes[i] = size;
|
2022-03-15 15:41:56 +01:00
|
|
|
hb->levels[i] = g_renew(unsigned long, hb->levels[i], size);
|
2015-04-18 01:50:03 +02:00
|
|
|
if (!shrink) {
|
|
|
|
memset(&hb->levels[i][old], 0x00,
|
|
|
|
(size - old) * sizeof(*hb->levels[i]));
|
|
|
|
}
|
|
|
|
}
|
2016-10-13 23:58:22 +02:00
|
|
|
if (hb->meta) {
|
|
|
|
hbitmap_truncate(hb->meta, hb->size << hb->granularity);
|
|
|
|
}
|
2015-04-18 01:50:03 +02:00
|
|
|
}
|
|
|
|
|
2019-07-29 22:35:53 +02:00
|
|
|
/**
|
|
|
|
* hbitmap_sparse_merge: performs dst = dst | src
|
|
|
|
* works with differing granularities.
|
|
|
|
* best used when src is sparsely populated.
|
|
|
|
*/
|
|
|
|
static void hbitmap_sparse_merge(HBitmap *dst, const HBitmap *src)
|
|
|
|
{
|
2020-02-05 12:20:38 +01:00
|
|
|
int64_t offset;
|
|
|
|
int64_t count;
|
2019-07-29 22:35:53 +02:00
|
|
|
|
2020-02-05 12:20:38 +01:00
|
|
|
for (offset = 0;
|
|
|
|
hbitmap_next_dirty_area(src, offset, src->orig_size, INT64_MAX,
|
|
|
|
&offset, &count);
|
|
|
|
offset += count)
|
|
|
|
{
|
2019-07-29 22:35:53 +02:00
|
|
|
hbitmap_set(dst, offset, count);
|
|
|
|
}
|
2018-10-29 21:23:15 +01:00
|
|
|
}
|
2015-04-18 01:50:03 +02:00
|
|
|
|
2015-04-18 01:49:55 +02:00
|
|
|
/**
|
2019-07-29 22:35:53 +02:00
|
|
|
* Given HBitmaps A and B, let R := A (BITOR) B.
|
|
|
|
* Bitmaps A and B will not be modified,
|
|
|
|
* except when bitmap R is an alias of A or B.
|
2022-05-17 13:12:06 +02:00
|
|
|
* Bitmaps must have same size.
|
2015-04-18 01:49:55 +02:00
|
|
|
*/
|
2022-05-17 13:12:06 +02:00
|
|
|
void hbitmap_merge(const HBitmap *a, const HBitmap *b, HBitmap *result)
|
2015-04-18 01:49:55 +02:00
|
|
|
{
|
|
|
|
int i;
|
|
|
|
uint64_t j;
|
|
|
|
|
2022-05-17 13:12:06 +02:00
|
|
|
assert(a->orig_size == result->orig_size);
|
|
|
|
assert(b->orig_size == result->orig_size);
|
2015-04-18 01:49:55 +02:00
|
|
|
|
2019-07-29 22:35:53 +02:00
|
|
|
if ((!hbitmap_count(a) && result == b) ||
|
|
|
|
(!hbitmap_count(b) && result == a)) {
|
2022-05-17 13:12:06 +02:00
|
|
|
return;
|
2019-07-29 22:35:53 +02:00
|
|
|
}
|
|
|
|
|
|
|
|
if (!hbitmap_count(a) && !hbitmap_count(b)) {
|
|
|
|
hbitmap_reset_all(result);
|
2022-05-17 13:12:06 +02:00
|
|
|
return;
|
2015-04-18 01:49:55 +02:00
|
|
|
}
|
|
|
|
|
2019-07-29 22:35:53 +02:00
|
|
|
if (a->granularity != b->granularity) {
|
|
|
|
if ((a != result) && (b != result)) {
|
|
|
|
hbitmap_reset_all(result);
|
|
|
|
}
|
|
|
|
if (a != result) {
|
|
|
|
hbitmap_sparse_merge(result, a);
|
|
|
|
}
|
|
|
|
if (b != result) {
|
|
|
|
hbitmap_sparse_merge(result, b);
|
|
|
|
}
|
2022-05-17 13:12:06 +02:00
|
|
|
return;
|
2019-07-29 22:35:53 +02:00
|
|
|
}
|
|
|
|
|
2015-04-18 01:49:55 +02:00
|
|
|
/* This merge is O(size), as BITS_PER_LONG and HBITMAP_LEVELS are constant.
|
|
|
|
* It may be possible to improve running times for sparsely populated maps
|
|
|
|
* by using hbitmap_iter_next, but this is suboptimal for dense maps.
|
|
|
|
*/
|
2019-07-29 22:35:53 +02:00
|
|
|
assert(a->size == b->size);
|
2015-04-18 01:49:55 +02:00
|
|
|
for (i = HBITMAP_LEVELS - 1; i >= 0; i--) {
|
|
|
|
for (j = 0; j < a->sizes[i]; j++) {
|
2018-10-29 21:23:15 +01:00
|
|
|
result->levels[i][j] = a->levels[i][j] | b->levels[i][j];
|
2015-04-18 01:49:55 +02:00
|
|
|
}
|
|
|
|
}
|
|
|
|
|
2018-10-29 21:23:17 +01:00
|
|
|
/* Recompute the dirty count */
|
|
|
|
result->count = hb_count_between(result, 0, result->size - 1);
|
2015-04-18 01:49:55 +02:00
|
|
|
}
|
2016-10-13 23:58:22 +02:00
|
|
|
|
2017-06-28 14:05:25 +02:00
|
|
|
char *hbitmap_sha256(const HBitmap *bitmap, Error **errp)
|
|
|
|
{
|
|
|
|
size_t size = bitmap->sizes[HBITMAP_LEVELS - 1] * sizeof(unsigned long);
|
|
|
|
char *data = (char *)bitmap->levels[HBITMAP_LEVELS - 1];
|
|
|
|
char *hash = NULL;
|
|
|
|
qcrypto_hash_digest(QCRYPTO_HASH_ALG_SHA256, data, size, &hash, errp);
|
|
|
|
|
|
|
|
return hash;
|
|
|
|
}
|