gecko/mfbt/BloomFilter.h
Nicholas Nethercote b408c9c462 Bug 1026319 - Convert the second quarter of MFBT to Gecko style. r=froydnj.
--HG--
extra : rebase_source : 98d2557c7fe4648d79143c654e7e31767fca2e65
2014-06-12 23:34:08 -07:00

257 lines
7.4 KiB
C++

/* -*- Mode: C++; tab-width: 8; indent-tabs-mode: nil; c-basic-offset: 2 -*- */
/* vim: set ts=8 sts=2 et sw=2 tw=80: */
/* This Source Code Form is subject to the terms of the Mozilla Public
* License, v. 2.0. If a copy of the MPL was not distributed with this
* file, You can obtain one at http://mozilla.org/MPL/2.0/. */
/*
* A counting Bloom filter implementation. This allows consumers to
* do fast probabilistic "is item X in set Y?" testing which will
* never answer "no" when the correct answer is "yes" (but might
* incorrectly answer "yes" when the correct answer is "no").
*/
#ifndef mozilla_BloomFilter_h
#define mozilla_BloomFilter_h
#include "mozilla/Assertions.h"
#include "mozilla/Likely.h"
#include <stdint.h>
#include <string.h>
namespace mozilla {
/*
* This class implements a counting Bloom filter as described at
* <http://en.wikipedia.org/wiki/Bloom_filter#Counting_filters>, with
* 8-bit counters. This allows quick probabilistic answers to the
* question "is object X in set Y?" where the contents of Y might not
* be time-invariant. The probabilistic nature of the test means that
* sometimes the answer will be "yes" when it should be "no". If the
* answer is "no", then X is guaranteed not to be in Y.
*
* The filter is parametrized on KeySize, which is the size of the key
* generated by each of hash functions used by the filter, in bits,
* and the type of object T being added and removed. T must implement
* a |uint32_t hash() const| method which returns a uint32_t hash key
* that will be used to generate the two separate hash functions for
* the Bloom filter. This hash key MUST be well-distributed for good
* results! KeySize is not allowed to be larger than 16.
*
* The filter uses exactly 2**KeySize bytes of memory. From now on we
* will refer to the memory used by the filter as M.
*
* The expected rate of incorrect "yes" answers depends on M and on
* the number N of objects in set Y. As long as N is small compared
* to M, the rate of such answers is expected to be approximately
* 4*(N/M)**2 for this filter. In practice, if Y has a few hundred
* elements then using a KeySize of 12 gives a reasonably low
* incorrect answer rate. A KeySize of 12 has the additional benefit
* of using exactly one page for the filter in typical hardware
* configurations.
*/
template<unsigned KeySize, class T>
class BloomFilter
{
/*
* A counting Bloom filter with 8-bit counters. For now we assume
* that having two hash functions is enough, but we may revisit that
* decision later.
*
* The filter uses an array with 2**KeySize entries.
*
* Assuming a well-distributed hash function, a Bloom filter with
* array size M containing N elements and
* using k hash function has expected false positive rate exactly
*
* $ (1 - (1 - 1/M)^{kN})^k $
*
* because each array slot has a
*
* $ (1 - 1/M)^{kN} $
*
* chance of being 0, and the expected false positive rate is the
* probability that all of the k hash functions will hit a nonzero
* slot.
*
* For reasonable assumptions (M large, kN large, which should both
* hold if we're worried about false positives) about M and kN this
* becomes approximately
*
* $$ (1 - \exp(-kN/M))^k $$
*
* For our special case of k == 2, that's $(1 - \exp(-2N/M))^2$,
* or in other words
*
* $$ N/M = -0.5 * \ln(1 - \sqrt(r)) $$
*
* where r is the false positive rate. This can be used to compute
* the desired KeySize for a given load N and false positive rate r.
*
* If N/M is assumed small, then the false positive rate can
* further be approximated as 4*N^2/M^2. So increasing KeySize by
* 1, which doubles M, reduces the false positive rate by about a
* factor of 4, and a false positive rate of 1% corresponds to
* about M/N == 20.
*
* What this means in practice is that for a few hundred keys using a
* KeySize of 12 gives false positive rates on the order of 0.25-4%.
*
* Similarly, using a KeySize of 10 would lead to a 4% false
* positive rate for N == 100 and to quite bad false positive
* rates for larger N.
*/
public:
BloomFilter()
{
static_assert(KeySize <= kKeyShift, "KeySize too big");
// Should we have a custom operator new using calloc instead and
// require that we're allocated via the operator?
clear();
}
/*
* Clear the filter. This should be done before reusing it, because
* just removing all items doesn't clear counters that hit the upper
* bound.
*/
void clear();
/*
* Add an item to the filter.
*/
void add(const T* aValue);
/*
* Remove an item from the filter.
*/
void remove(const T* aValue);
/*
* Check whether the filter might contain an item. This can
* sometimes return true even if the item is not in the filter,
* but will never return false for items that are actually in the
* filter.
*/
bool mightContain(const T* aValue) const;
/*
* Methods for add/remove/contain when we already have a hash computed
*/
void add(uint32_t aHash);
void remove(uint32_t aHash);
bool mightContain(uint32_t aHash) const;
private:
static const size_t kArraySize = (1 << KeySize);
static const uint32_t kKeyMask = (1 << KeySize) - 1;
static const uint32_t kKeyShift = 16;
static uint32_t hash1(uint32_t aHash)
{
return aHash & kKeyMask;
}
static uint32_t hash2(uint32_t aHash)
{
return (aHash >> kKeyShift) & kKeyMask;
}
uint8_t& firstSlot(uint32_t aHash)
{
return mCounters[hash1(aHash)];
}
uint8_t& secondSlot(uint32_t aHash)
{
return mCounters[hash2(aHash)];
}
const uint8_t& firstSlot(uint32_t aHash) const
{
return mCounters[hash1(aHash)];
}
const uint8_t& secondSlot(uint32_t aHash) const
{
return mCounters[hash2(aHash)];
}
static bool full(const uint8_t& aSlot) { return aSlot == UINT8_MAX; }
uint8_t mCounters[kArraySize];
};
template<unsigned KeySize, class T>
inline void
BloomFilter<KeySize, T>::clear()
{
memset(mCounters, 0, kArraySize);
}
template<unsigned KeySize, class T>
inline void
BloomFilter<KeySize, T>::add(uint32_t aHash)
{
uint8_t& slot1 = firstSlot(aHash);
if (MOZ_LIKELY(!full(slot1))) {
++slot1;
}
uint8_t& slot2 = secondSlot(aHash);
if (MOZ_LIKELY(!full(slot2))) {
++slot2;
}
}
template<unsigned KeySize, class T>
MOZ_ALWAYS_INLINE void
BloomFilter<KeySize, T>::add(const T* aValue)
{
uint32_t hash = aValue->hash();
return add(hash);
}
template<unsigned KeySize, class T>
inline void
BloomFilter<KeySize, T>::remove(uint32_t aHash)
{
// If the slots are full, we don't know whether we bumped them to be
// there when we added or not, so just leave them full.
uint8_t& slot1 = firstSlot(aHash);
if (MOZ_LIKELY(!full(slot1))) {
--slot1;
}
uint8_t& slot2 = secondSlot(aHash);
if (MOZ_LIKELY(!full(slot2))) {
--slot2;
}
}
template<unsigned KeySize, class T>
MOZ_ALWAYS_INLINE void
BloomFilter<KeySize, T>::remove(const T* aValue)
{
uint32_t hash = aValue->hash();
remove(hash);
}
template<unsigned KeySize, class T>
MOZ_ALWAYS_INLINE bool
BloomFilter<KeySize, T>::mightContain(uint32_t aHash) const
{
// Check that all the slots for this hash contain something
return firstSlot(aHash) && secondSlot(aHash);
}
template<unsigned KeySize, class T>
MOZ_ALWAYS_INLINE bool
BloomFilter<KeySize, T>::mightContain(const T* aValue) const
{
uint32_t hash = aValue->hash();
return mightContain(hash);
}
} // namespace mozilla
#endif /* mozilla_BloomFilter_h */