test/boolcoder_test.cc - aom - Git at Google

 /*
  * Copyright (c) 2016, Alliance for Open Media. All rights reserved
  *
  * This source code is subject to the terms of the BSD 2 Clause License and
  * the Alliance for Open Media Patent License 1.0. If the BSD 2 Clause License
  * was not distributed with this source code in the LICENSE file, you can
  * obtain it at www.aomedia.org/license/software. If the Alliance for Open
  * Media Patent License 1.0 was not distributed with this source code in the
  * PATENTS file, you can obtain it at www.aomedia.org/license/patent.
  */

 #include <math.h>
 #include <stdlib.h>
 #include <string.h>

 #include "third_party/googletest/src/googletest/include/gtest/gtest.h"

 #include "test/acm_random.h"
 #include "aom/aom_integer.h"
 #include "aom_dsp/bitreader.h"
 #include "aom_dsp/bitwriter.h"

 using libaom_test::ACMRandom;

 namespace {
 const int num_tests = 10;
 }  // namespace

 TEST(AV1, TestBitIO) {
   ACMRandom rnd(ACMRandom::DeterministicSeed());
   for (int n = 0; n < num_tests; ++n) {
     for (int method = 0; method <= 7; ++method) {  // we generate various proba
       const int kBitsToTest = 1000;
       uint8_t probas[kBitsToTest];

       for (int i = 0; i < kBitsToTest; ++i) {
         const int parity = i & 1;
         /* clang-format off */
         probas[i] =
           (method == 0) ? 0 : (method == 1) ? 255 :
           (method == 2) ? 128 :
           (method == 3) ? rnd.Rand8() :
           (method == 4) ? (parity ? 0 : 255) :
             // alternate between low and high proba:
             (method == 5) ? (parity ? rnd(128) : 255 - rnd(128)) :
             (method == 6) ?
             (parity ? rnd(64) : 255 - rnd(64)) :
             (parity ? rnd(32) : 255 - rnd(32));
         /* clang-format on */
       }
       for (int bit_method = 0; bit_method <= 3; ++bit_method) {
         const int random_seed = 6432;
         const int kBufferSize = 10000;
         ACMRandom bit_rnd(random_seed);
         aom_writer bw;
         uint8_t bw_buffer[kBufferSize];
         aom_start_encode(&bw, bw_buffer);

         int bit = (bit_method == 0) ? 0 : (bit_method == 1) ? 1 : 0;
         for (int i = 0; i < kBitsToTest; ++i) {
           if (bit_method == 2) {
             bit = (i & 1);
           } else if (bit_method == 3) {
             bit = bit_rnd(2);
           }
           aom_write(&bw, bit, static_cast<int>(probas[i]));
         }

         aom_stop_encode(&bw);

         aom_reader br;
         aom_reader_init(&br, bw_buffer, bw.pos);
         bit_rnd.Reset(random_seed);
         for (int i = 0; i < kBitsToTest; ++i) {
           if (bit_method == 2) {
             bit = (i & 1);
           } else if (bit_method == 3) {
             bit = bit_rnd(2);
           }
           GTEST_ASSERT_EQ(aom_read(&br, probas[i], NULL), bit)
               << "pos: " << i << " / " << kBitsToTest
               << " bit_method: " << bit_method << " method: " << method;
         }
       }
     }
   }
 }

 #define FRAC_DIFF_TOTAL_ERROR 0.18

 TEST(AV1, TestTell) {
   const int kBufferSize = 10000;
   aom_writer bw;
   uint8_t bw_buffer[kBufferSize];
   const int kSymbols = 1024;
   // Coders are noisier at low probabilities, so we start at p = 4.
   for (int p = 4; p < 256; p++) {
     double probability = p / 256.;
     aom_start_encode(&bw, bw_buffer);
     for (int i = 0; i < kSymbols; i++) {
       aom_write(&bw, 0, p);
     }
     aom_stop_encode(&bw);
     aom_reader br;
     aom_reader_init(&br, bw_buffer, bw.pos);
     uint32_t last_tell = aom_reader_tell(&br);
     uint32_t last_tell_frac = aom_reader_tell_frac(&br);
     double frac_diff_total = 0;
     GTEST_ASSERT_GE(aom_reader_tell(&br), 0u);
     GTEST_ASSERT_LE(aom_reader_tell(&br), 1u);
     ASSERT_FALSE(aom_reader_has_overflowed(&br));
     for (int i = 0; i < kSymbols; i++) {
       aom_read(&br, p, NULL);
       uint32_t tell = aom_reader_tell(&br);
       uint32_t tell_frac = aom_reader_tell_frac(&br);
       GTEST_ASSERT_GE(tell, last_tell)
           << "tell: " << tell << ", last_tell: " << last_tell;
       GTEST_ASSERT_GE(tell_frac, last_tell_frac)
           << "tell_frac: " << tell_frac
           << ", last_tell_frac: " << last_tell_frac;
       // Frac tell should round up to tell.
       GTEST_ASSERT_EQ(tell, (tell_frac + 7) >> 3);
       last_tell = tell;
       frac_diff_total +=
           fabs(((tell_frac - last_tell_frac) / 8.0) + log2(probability));
       last_tell_frac = tell_frac;
     }
     const uint32_t expected = (uint32_t)(-kSymbols * log2(probability));
     // Last tell should be close to the expected value.
     GTEST_ASSERT_LE(last_tell, expected + 20) << " last_tell: " << last_tell;
     // The average frac_diff error should be pretty small.
     GTEST_ASSERT_LE(frac_diff_total / kSymbols, FRAC_DIFF_TOTAL_ERROR)
         << " frac_diff_total: " << frac_diff_total;
     ASSERT_FALSE(aom_reader_has_overflowed(&br));
   }
 }

 TEST(AV1, TestHasOverflowed) {
   const int kBufferSize = 10000;
   aom_writer bw;
   uint8_t bw_buffer[kBufferSize];
   const int kSymbols = 1024;
   // Coders are noisier at low probabilities, so we start at p = 4.
   for (int p = 4; p < 256; p++) {
     aom_start_encode(&bw, bw_buffer);
     for (int i = 0; i < kSymbols; i++) {
       aom_write(&bw, 1, p);
     }
     aom_stop_encode(&bw);
     aom_reader br;
     aom_reader_init(&br, bw_buffer, bw.pos);
     ASSERT_FALSE(aom_reader_has_overflowed(&br));
     for (int i = 0; i < kSymbols; i++) {
       GTEST_ASSERT_EQ(aom_read(&br, p, NULL), 1);
       ASSERT_FALSE(aom_reader_has_overflowed(&br));
     }
     // In the worst case, the encoder uses just a tiny fraction of the last
     // byte in the buffer. So to guarantee that aom_reader_has_overflowed()
     // returns true, we have to consume very nearly 8 additional bits of data.
     // In the worse case, one of the bits in that byte will be 1, and the rest
     // will be zero. Once we are past that 1 bit, when the probability of
     // reading zero symbol from aom_read() is high, each additional symbol read
     // will consume very little additional data (in the case that p == 255,
     // approximately -log_2(255/256) ~= 0.0056 bits). In that case it would
     // take around 178 calls to consume more than 8 bits. That is only an upper
     // bound. In practice we are not guaranteed to hit the worse case and can
     // get away with 174 calls.
     for (int i = 0; i < 174; i++) {
       aom_read(&br, p, NULL);
     }
     ASSERT_TRUE(aom_reader_has_overflowed(&br));
   }
 }
	/*
	* Copyright (c) 2016, Alliance for Open Media. All rights reserved
	*
	* This source code is subject to the terms of the BSD 2 Clause License and
	* the Alliance for Open Media Patent License 1.0. If the BSD 2 Clause License
	* was not distributed with this source code in the LICENSE file, you can
	* obtain it at www.aomedia.org/license/software. If the Alliance for Open
	* Media Patent License 1.0 was not distributed with this source code in the
	* PATENTS file, you can obtain it at www.aomedia.org/license/patent.
	*/

	#include <math.h>
	#include <stdlib.h>
	#include <string.h>

	#include "third_party/googletest/src/googletest/include/gtest/gtest.h"

	#include "test/acm_random.h"
	#include "aom/aom_integer.h"
	#include "aom_dsp/bitreader.h"
	#include "aom_dsp/bitwriter.h"

	using libaom_test::ACMRandom;

	namespace {
	const int num_tests = 10;
	} // namespace

	TEST(AV1, TestBitIO) {
	ACMRandom rnd(ACMRandom::DeterministicSeed());
	for (int n = 0; n < num_tests; ++n) {
	for (int method = 0; method <= 7; ++method) { // we generate various proba
	const int kBitsToTest = 1000;
	uint8_t probas[kBitsToTest];

	for (int i = 0; i < kBitsToTest; ++i) {
	const int parity = i & 1;
	/* clang-format off */
	probas[i] =
	(method == 0) ? 0 : (method == 1) ? 255 :
	(method == 2) ? 128 :
	(method == 3) ? rnd.Rand8() :
	(method == 4) ? (parity ? 0 : 255) :
	// alternate between low and high proba:
	(method == 5) ? (parity ? rnd(128) : 255 - rnd(128)) :
	(method == 6) ?
	(parity ? rnd(64) : 255 - rnd(64)) :
	(parity ? rnd(32) : 255 - rnd(32));
	/* clang-format on */
	}
	for (int bit_method = 0; bit_method <= 3; ++bit_method) {
	const int random_seed = 6432;
	const int kBufferSize = 10000;
	ACMRandom bit_rnd(random_seed);
	aom_writer bw;
	uint8_t bw_buffer[kBufferSize];
	aom_start_encode(&bw, bw_buffer);

	int bit = (bit_method == 0) ? 0 : (bit_method == 1) ? 1 : 0;
	for (int i = 0; i < kBitsToTest; ++i) {
	if (bit_method == 2) {
	bit = (i & 1);
	} else if (bit_method == 3) {
	bit = bit_rnd(2);
	}
	aom_write(&bw, bit, static_cast<int>(probas[i]));
	}

	aom_stop_encode(&bw);

	aom_reader br;
	aom_reader_init(&br, bw_buffer, bw.pos);
	bit_rnd.Reset(random_seed);
	for (int i = 0; i < kBitsToTest; ++i) {
	if (bit_method == 2) {
	bit = (i & 1);
	} else if (bit_method == 3) {
	bit = bit_rnd(2);
	}
	GTEST_ASSERT_EQ(aom_read(&br, probas[i], NULL), bit)
	<< "pos: " << i << " / " << kBitsToTest
	<< " bit_method: " << bit_method << " method: " << method;
	}
	}
	}
	}
	}

	#define FRAC_DIFF_TOTAL_ERROR 0.18

	TEST(AV1, TestTell) {
	const int kBufferSize = 10000;
	aom_writer bw;
	uint8_t bw_buffer[kBufferSize];
	const int kSymbols = 1024;
	// Coders are noisier at low probabilities, so we start at p = 4.
	for (int p = 4; p < 256; p++) {
	double probability = p / 256.;
	aom_start_encode(&bw, bw_buffer);
	for (int i = 0; i < kSymbols; i++) {
	aom_write(&bw, 0, p);
	}
	aom_stop_encode(&bw);
	aom_reader br;
	aom_reader_init(&br, bw_buffer, bw.pos);
	uint32_t last_tell = aom_reader_tell(&br);
	uint32_t last_tell_frac = aom_reader_tell_frac(&br);
	double frac_diff_total = 0;
	GTEST_ASSERT_GE(aom_reader_tell(&br), 0u);
	GTEST_ASSERT_LE(aom_reader_tell(&br), 1u);
	ASSERT_FALSE(aom_reader_has_overflowed(&br));
	for (int i = 0; i < kSymbols; i++) {
	aom_read(&br, p, NULL);
	uint32_t tell = aom_reader_tell(&br);
	uint32_t tell_frac = aom_reader_tell_frac(&br);
	GTEST_ASSERT_GE(tell, last_tell)
	<< "tell: " << tell << ", last_tell: " << last_tell;
	GTEST_ASSERT_GE(tell_frac, last_tell_frac)
	<< "tell_frac: " << tell_frac
	<< ", last_tell_frac: " << last_tell_frac;
	// Frac tell should round up to tell.
	GTEST_ASSERT_EQ(tell, (tell_frac + 7) >> 3);
	last_tell = tell;
	frac_diff_total +=
	fabs(((tell_frac - last_tell_frac) / 8.0) + log2(probability));
	last_tell_frac = tell_frac;
	}
	const uint32_t expected = (uint32_t)(-kSymbols * log2(probability));
	// Last tell should be close to the expected value.
	GTEST_ASSERT_LE(last_tell, expected + 20) << " last_tell: " << last_tell;
	// The average frac_diff error should be pretty small.
	GTEST_ASSERT_LE(frac_diff_total / kSymbols, FRAC_DIFF_TOTAL_ERROR)
	<< " frac_diff_total: " << frac_diff_total;
	ASSERT_FALSE(aom_reader_has_overflowed(&br));
	}
	}

	TEST(AV1, TestHasOverflowed) {
	const int kBufferSize = 10000;
	aom_writer bw;
	uint8_t bw_buffer[kBufferSize];
	const int kSymbols = 1024;
	// Coders are noisier at low probabilities, so we start at p = 4.
	for (int p = 4; p < 256; p++) {
	aom_start_encode(&bw, bw_buffer);
	for (int i = 0; i < kSymbols; i++) {
	aom_write(&bw, 1, p);
	}
	aom_stop_encode(&bw);
	aom_reader br;
	aom_reader_init(&br, bw_buffer, bw.pos);
	ASSERT_FALSE(aom_reader_has_overflowed(&br));
	for (int i = 0; i < kSymbols; i++) {
	GTEST_ASSERT_EQ(aom_read(&br, p, NULL), 1);
	ASSERT_FALSE(aom_reader_has_overflowed(&br));
	}
	// In the worst case, the encoder uses just a tiny fraction of the last
	// byte in the buffer. So to guarantee that aom_reader_has_overflowed()
	// returns true, we have to consume very nearly 8 additional bits of data.
	// In the worse case, one of the bits in that byte will be 1, and the rest
	// will be zero. Once we are past that 1 bit, when the probability of
	// reading zero symbol from aom_read() is high, each additional symbol read
	// will consume very little additional data (in the case that p == 255,
	// approximately -log_2(255/256) ~= 0.0056 bits). In that case it would
	// take around 178 calls to consume more than 8 bits. That is only an upper
	// bound. In practice we are not guaranteed to hit the worse case and can
	// get away with 174 calls.
	for (int i = 0; i < 174; i++) {
	aom_read(&br, p, NULL);
	}
	ASSERT_TRUE(aom_reader_has_overflowed(&br));
	}
	}