brotli/enc/fast_log.h - platform/external/chromium_org/third_party/brotli/src - Git at Google

 // Copyright 2013 Google Inc. All Rights Reserved.
 //
 // Licensed under the Apache License, Version 2.0 (the "License");
 // you may not use this file except in compliance with the License.
 // You may obtain a copy of the License at
 //
 // http://www.apache.org/licenses/LICENSE-2.0
 //
 // Unless required by applicable law or agreed to in writing, software
 // distributed under the License is distributed on an "AS IS" BASIS,
 // WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 // See the License for the specific language governing permissions and
 // limitations under the License.
 //
 // Utilities for fast computation of logarithms.

 #ifndef BROTLI_ENC_FAST_LOG_H_
 #define BROTLI_ENC_FAST_LOG_H_

 #include <math.h>
 #include <stdint.h>

 namespace brotli {

 // Return floor(log2(n)) for positive integer n.  Returns -1 iff n == 0.
 inline int Log2Floor(uint32_t n) {
 #if defined(__clang__) ||                       \
   (defined(__GNUC__) &&                                         \
    ((__GNUC__ == 3 && __GNUC_MINOR__ >= 4) || __GNUC__ >= 4))
   return n == 0 ? -1 : 31 ^ __builtin_clz(n);
 #else
   if (n == 0)
     return -1;
   int log = 0;
   uint32_t value = n;
   for (int i = 4; i >= 0; --i) {
     int shift = (1 << i);
     uint32_t x = value >> shift;
     if (x != 0) {
       value = x;
       log += shift;
     }
   }
   assert(value == 1);
   return log;
 #endif
 }

 // Return ceiling(log2(n)) for positive integer n.  Returns -1 iff n == 0.
 inline int Log2Ceiling(uint32_t n) {
   int floor = Log2Floor(n);
   if (n == (n &~ (n - 1)))              // zero or a power of two
     return floor;
   else
     return floor + 1;
 }

 // A lookup table for small values of log2(int) to be used in entropy
 // computation.
 //
 // ", ".join(["%.16ff" % x for x in [0.0]+[log2(x) for x in range(1, 256)]])
 static const float kLog2Table[] = {
   0.0000000000000000f, 0.0000000000000000f, 1.0000000000000000f,
   1.5849625007211563f, 2.0000000000000000f, 2.3219280948873622f,
   2.5849625007211561f, 2.8073549220576042f, 3.0000000000000000f,
   3.1699250014423126f, 3.3219280948873626f, 3.4594316186372978f,
   3.5849625007211565f, 3.7004397181410922f, 3.8073549220576037f,
   3.9068905956085187f, 4.0000000000000000f, 4.0874628412503400f,
   4.1699250014423122f, 4.2479275134435852f, 4.3219280948873626f,
   4.3923174227787607f, 4.4594316186372973f, 4.5235619560570131f,
   4.5849625007211570f, 4.6438561897747244f, 4.7004397181410926f,
   4.7548875021634691f, 4.8073549220576037f, 4.8579809951275728f,
   4.9068905956085187f, 4.9541963103868758f, 5.0000000000000000f,
   5.0443941193584534f, 5.0874628412503400f, 5.1292830169449664f,
   5.1699250014423122f, 5.2094533656289501f, 5.2479275134435852f,
   5.2854022188622487f, 5.3219280948873626f, 5.3575520046180838f,
   5.3923174227787607f, 5.4262647547020979f, 5.4594316186372973f,
   5.4918530963296748f, 5.5235619560570131f, 5.5545888516776376f,
   5.5849625007211570f, 5.6147098441152083f, 5.6438561897747244f,
   5.6724253419714961f, 5.7004397181410926f, 5.7279204545631996f,
   5.7548875021634691f, 5.7813597135246599f, 5.8073549220576046f,
   5.8328900141647422f, 5.8579809951275719f, 5.8826430493618416f,
   5.9068905956085187f, 5.9307373375628867f, 5.9541963103868758f,
   5.9772799234999168f, 6.0000000000000000f, 6.0223678130284544f,
   6.0443941193584534f, 6.0660891904577721f, 6.0874628412503400f,
   6.1085244567781700f, 6.1292830169449672f, 6.1497471195046822f,
   6.1699250014423122f, 6.1898245588800176f, 6.2094533656289510f,
   6.2288186904958804f, 6.2479275134435861f, 6.2667865406949019f,
   6.2854022188622487f, 6.3037807481771031f, 6.3219280948873617f,
   6.3398500028846252f, 6.3575520046180847f, 6.3750394313469254f,
   6.3923174227787598f, 6.4093909361377026f, 6.4262647547020979f,
   6.4429434958487288f, 6.4594316186372982f, 6.4757334309663976f,
   6.4918530963296748f, 6.5077946401986964f, 6.5235619560570131f,
   6.5391588111080319f, 6.5545888516776376f, 6.5698556083309478f,
   6.5849625007211561f, 6.5999128421871278f, 6.6147098441152092f,
   6.6293566200796095f, 6.6438561897747253f, 6.6582114827517955f,
   6.6724253419714952f, 6.6865005271832185f, 6.7004397181410917f,
   6.7142455176661224f, 6.7279204545631988f, 6.7414669864011465f,
   6.7548875021634691f, 6.7681843247769260f, 6.7813597135246599f,
   6.7944158663501062f, 6.8073549220576037f, 6.8201789624151887f,
   6.8328900141647422f, 6.8454900509443757f, 6.8579809951275719f,
   6.8703647195834048f, 6.8826430493618416f, 6.8948177633079437f,
   6.9068905956085187f, 6.9188632372745955f, 6.9307373375628867f,
   6.9425145053392399f, 6.9541963103868758f, 6.9657842846620879f,
   6.9772799234999168f, 6.9886846867721664f, 7.0000000000000000f,
   7.0112272554232540f, 7.0223678130284544f, 7.0334230015374501f,
   7.0443941193584534f, 7.0552824355011898f, 7.0660891904577721f,
   7.0768155970508317f, 7.0874628412503400f, 7.0980320829605272f,
   7.1085244567781700f, 7.1189410727235076f, 7.1292830169449664f,
   7.1395513523987937f, 7.1497471195046822f, 7.1598713367783891f,
   7.1699250014423130f, 7.1799090900149345f, 7.1898245588800176f,
   7.1996723448363644f, 7.2094533656289492f, 7.2191685204621621f,
   7.2288186904958804f, 7.2384047393250794f, 7.2479275134435861f,
   7.2573878426926521f, 7.2667865406949019f, 7.2761244052742384f,
   7.2854022188622487f, 7.2946207488916270f, 7.3037807481771031f,
   7.3128829552843557f, 7.3219280948873617f, 7.3309168781146177f,
   7.3398500028846243f, 7.3487281542310781f, 7.3575520046180847f,
   7.3663222142458151f, 7.3750394313469254f, 7.3837042924740528f,
   7.3923174227787607f, 7.4008794362821844f, 7.4093909361377026f,
   7.4178525148858991f, 7.4262647547020979f, 7.4346282276367255f,
   7.4429434958487288f, 7.4512111118323299f, 7.4594316186372973f,
   7.4676055500829976f, 7.4757334309663976f, 7.4838157772642564f,
   7.4918530963296748f, 7.4998458870832057f, 7.5077946401986964f,
   7.5156998382840436f, 7.5235619560570131f, 7.5313814605163119f,
   7.5391588111080319f, 7.5468944598876373f, 7.5545888516776376f,
   7.5622424242210728f, 7.5698556083309478f, 7.5774288280357487f,
   7.5849625007211561f, 7.5924570372680806f, 7.5999128421871278f,
   7.6073303137496113f, 7.6147098441152075f, 7.6220518194563764f,
   7.6293566200796095f, 7.6366246205436488f, 7.6438561897747244f,
   7.6510516911789290f, 7.6582114827517955f, 7.6653359171851765f,
   7.6724253419714952f, 7.6794800995054464f, 7.6865005271832185f,
   7.6934869574993252f, 7.7004397181410926f, 7.7073591320808825f,
   7.7142455176661224f, 7.7210991887071856f, 7.7279204545631996f,
   7.7347096202258392f, 7.7414669864011465f, 7.7481928495894596f,
   7.7548875021634691f, 7.7615512324444795f, 7.7681843247769260f,
   7.7747870596011737f, 7.7813597135246608f, 7.7879025593914317f,
   7.7944158663501062f, 7.8008998999203047f, 7.8073549220576037f,
   7.8137811912170374f, 7.8201789624151887f, 7.8265484872909159f,
   7.8328900141647422f, 7.8392037880969445f, 7.8454900509443757f,
   7.8517490414160571f, 7.8579809951275719f, 7.8641861446542798f,
   7.8703647195834048f, 7.8765169465650002f, 7.8826430493618425f,
   7.8887432488982601f, 7.8948177633079446f, 7.9008668079807496f,
   7.9068905956085187f, 7.9128893362299619f, 7.9188632372745955f,
   7.9248125036057813f, 7.9307373375628867f, 7.9366379390025719f,
   7.9425145053392399f, 7.9483672315846778f, 7.9541963103868758f,
   7.9600019320680806f, 7.9657842846620870f, 7.9715435539507720f,
   7.9772799234999168f, 7.9829935746943104f, 7.9886846867721664f,
   7.9943534368588578f
 };

 // Faster logarithm for small integers, with the property of log2(0) == 0.
 static inline double FastLog2(int v) {
   if (v < (int)(sizeof(kLog2Table) / sizeof(kLog2Table[0]))) {
     return kLog2Table[v];
   }
   return log2(v);
 }

 }  // namespace brotli

 #endif  // BROTLI_ENC_FAST_LOG_H_
	// Copyright 2013 Google Inc. All Rights Reserved.
	//
	// Licensed under the Apache License, Version 2.0 (the "License");
	// you may not use this file except in compliance with the License.
	// You may obtain a copy of the License at
	//
	// http://www.apache.org/licenses/LICENSE-2.0
	//
	// Unless required by applicable law or agreed to in writing, software
	// distributed under the License is distributed on an "AS IS" BASIS,
	// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	// See the License for the specific language governing permissions and
	// limitations under the License.
	//
	// Utilities for fast computation of logarithms.

	#ifndef BROTLI_ENC_FAST_LOG_H_
	#define BROTLI_ENC_FAST_LOG_H_

	#include <math.h>
	#include <stdint.h>

	namespace brotli {

	// Return floor(log2(n)) for positive integer n. Returns -1 iff n == 0.
	inline int Log2Floor(uint32_t n) {
	#if defined(__clang__) \|\| \
	(defined(__GNUC__) && \
	((__GNUC__ == 3 && __GNUC_MINOR__ >= 4) \|\| __GNUC__ >= 4))
	return n == 0 ? -1 : 31 ^ __builtin_clz(n);
	#else
	if (n == 0)
	return -1;
	int log = 0;
	uint32_t value = n;
	for (int i = 4; i >= 0; --i) {
	int shift = (1 << i);
	uint32_t x = value >> shift;
	if (x != 0) {
	value = x;
	log += shift;
	}
	}
	assert(value == 1);
	return log;
	#endif
	}

	// Return ceiling(log2(n)) for positive integer n. Returns -1 iff n == 0.
	inline int Log2Ceiling(uint32_t n) {
	int floor = Log2Floor(n);
	if (n == (n &~ (n - 1))) // zero or a power of two
	return floor;
	else
	return floor + 1;
	}

	// A lookup table for small values of log2(int) to be used in entropy
	// computation.
	//
	// ", ".join(["%.16ff" % x for x in [0.0]+[log2(x) for x in range(1, 256)]])
	static const float kLog2Table[] = {
	0.0000000000000000f, 0.0000000000000000f, 1.0000000000000000f,
	1.5849625007211563f, 2.0000000000000000f, 2.3219280948873622f,
	2.5849625007211561f, 2.8073549220576042f, 3.0000000000000000f,
	3.1699250014423126f, 3.3219280948873626f, 3.4594316186372978f,
	3.5849625007211565f, 3.7004397181410922f, 3.8073549220576037f,
	3.9068905956085187f, 4.0000000000000000f, 4.0874628412503400f,
	4.1699250014423122f, 4.2479275134435852f, 4.3219280948873626f,
	4.3923174227787607f, 4.4594316186372973f, 4.5235619560570131f,
	4.5849625007211570f, 4.6438561897747244f, 4.7004397181410926f,
	4.7548875021634691f, 4.8073549220576037f, 4.8579809951275728f,
	4.9068905956085187f, 4.9541963103868758f, 5.0000000000000000f,
	5.0443941193584534f, 5.0874628412503400f, 5.1292830169449664f,
	5.1699250014423122f, 5.2094533656289501f, 5.2479275134435852f,
	5.2854022188622487f, 5.3219280948873626f, 5.3575520046180838f,
	5.3923174227787607f, 5.4262647547020979f, 5.4594316186372973f,
	5.4918530963296748f, 5.5235619560570131f, 5.5545888516776376f,
	5.5849625007211570f, 5.6147098441152083f, 5.6438561897747244f,
	5.6724253419714961f, 5.7004397181410926f, 5.7279204545631996f,
	5.7548875021634691f, 5.7813597135246599f, 5.8073549220576046f,
	5.8328900141647422f, 5.8579809951275719f, 5.8826430493618416f,
	5.9068905956085187f, 5.9307373375628867f, 5.9541963103868758f,
	5.9772799234999168f, 6.0000000000000000f, 6.0223678130284544f,
	6.0443941193584534f, 6.0660891904577721f, 6.0874628412503400f,
	6.1085244567781700f, 6.1292830169449672f, 6.1497471195046822f,
	6.1699250014423122f, 6.1898245588800176f, 6.2094533656289510f,
	6.2288186904958804f, 6.2479275134435861f, 6.2667865406949019f,
	6.2854022188622487f, 6.3037807481771031f, 6.3219280948873617f,
	6.3398500028846252f, 6.3575520046180847f, 6.3750394313469254f,
	6.3923174227787598f, 6.4093909361377026f, 6.4262647547020979f,
	6.4429434958487288f, 6.4594316186372982f, 6.4757334309663976f,
	6.4918530963296748f, 6.5077946401986964f, 6.5235619560570131f,
	6.5391588111080319f, 6.5545888516776376f, 6.5698556083309478f,
	6.5849625007211561f, 6.5999128421871278f, 6.6147098441152092f,
	6.6293566200796095f, 6.6438561897747253f, 6.6582114827517955f,
	6.6724253419714952f, 6.6865005271832185f, 6.7004397181410917f,
	6.7142455176661224f, 6.7279204545631988f, 6.7414669864011465f,
	6.7548875021634691f, 6.7681843247769260f, 6.7813597135246599f,
	6.7944158663501062f, 6.8073549220576037f, 6.8201789624151887f,
	6.8328900141647422f, 6.8454900509443757f, 6.8579809951275719f,
	6.8703647195834048f, 6.8826430493618416f, 6.8948177633079437f,
	6.9068905956085187f, 6.9188632372745955f, 6.9307373375628867f,
	6.9425145053392399f, 6.9541963103868758f, 6.9657842846620879f,
	6.9772799234999168f, 6.9886846867721664f, 7.0000000000000000f,
	7.0112272554232540f, 7.0223678130284544f, 7.0334230015374501f,
	7.0443941193584534f, 7.0552824355011898f, 7.0660891904577721f,
	7.0768155970508317f, 7.0874628412503400f, 7.0980320829605272f,
	7.1085244567781700f, 7.1189410727235076f, 7.1292830169449664f,
	7.1395513523987937f, 7.1497471195046822f, 7.1598713367783891f,
	7.1699250014423130f, 7.1799090900149345f, 7.1898245588800176f,
	7.1996723448363644f, 7.2094533656289492f, 7.2191685204621621f,
	7.2288186904958804f, 7.2384047393250794f, 7.2479275134435861f,
	7.2573878426926521f, 7.2667865406949019f, 7.2761244052742384f,
	7.2854022188622487f, 7.2946207488916270f, 7.3037807481771031f,
	7.3128829552843557f, 7.3219280948873617f, 7.3309168781146177f,
	7.3398500028846243f, 7.3487281542310781f, 7.3575520046180847f,
	7.3663222142458151f, 7.3750394313469254f, 7.3837042924740528f,
	7.3923174227787607f, 7.4008794362821844f, 7.4093909361377026f,
	7.4178525148858991f, 7.4262647547020979f, 7.4346282276367255f,
	7.4429434958487288f, 7.4512111118323299f, 7.4594316186372973f,
	7.4676055500829976f, 7.4757334309663976f, 7.4838157772642564f,
	7.4918530963296748f, 7.4998458870832057f, 7.5077946401986964f,
	7.5156998382840436f, 7.5235619560570131f, 7.5313814605163119f,
	7.5391588111080319f, 7.5468944598876373f, 7.5545888516776376f,
	7.5622424242210728f, 7.5698556083309478f, 7.5774288280357487f,
	7.5849625007211561f, 7.5924570372680806f, 7.5999128421871278f,
	7.6073303137496113f, 7.6147098441152075f, 7.6220518194563764f,
	7.6293566200796095f, 7.6366246205436488f, 7.6438561897747244f,
	7.6510516911789290f, 7.6582114827517955f, 7.6653359171851765f,
	7.6724253419714952f, 7.6794800995054464f, 7.6865005271832185f,
	7.6934869574993252f, 7.7004397181410926f, 7.7073591320808825f,
	7.7142455176661224f, 7.7210991887071856f, 7.7279204545631996f,
	7.7347096202258392f, 7.7414669864011465f, 7.7481928495894596f,
	7.7548875021634691f, 7.7615512324444795f, 7.7681843247769260f,
	7.7747870596011737f, 7.7813597135246608f, 7.7879025593914317f,
	7.7944158663501062f, 7.8008998999203047f, 7.8073549220576037f,
	7.8137811912170374f, 7.8201789624151887f, 7.8265484872909159f,
	7.8328900141647422f, 7.8392037880969445f, 7.8454900509443757f,
	7.8517490414160571f, 7.8579809951275719f, 7.8641861446542798f,
	7.8703647195834048f, 7.8765169465650002f, 7.8826430493618425f,
	7.8887432488982601f, 7.8948177633079446f, 7.9008668079807496f,
	7.9068905956085187f, 7.9128893362299619f, 7.9188632372745955f,
	7.9248125036057813f, 7.9307373375628867f, 7.9366379390025719f,
	7.9425145053392399f, 7.9483672315846778f, 7.9541963103868758f,
	7.9600019320680806f, 7.9657842846620870f, 7.9715435539507720f,
	7.9772799234999168f, 7.9829935746943104f, 7.9886846867721664f,
	7.9943534368588578f
	};

	// Faster logarithm for small integers, with the property of log2(0) == 0.
	static inline double FastLog2(int v) {
	if (v < (int)(sizeof(kLog2Table) / sizeof(kLog2Table[0]))) {
	return kLog2Table[v];
	}
	return log2(v);
	}

	} // namespace brotli

	#endif // BROTLI_ENC_FAST_LOG_H_