/* * Copyright (C) 2010 The Android Open Source Project * * 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. */ /* A Fixed point implementation of Fast Fourier Transform (FFT). Complex numbers * are represented by 32-bit integers, where higher 16 bits are real part and * lower ones are imaginary part. Few compromises are made between efficiency, * accuracy, and maintainability. To make it fast, arithmetic shifts are used * instead of divisions, and bitwise inverses are used instead of negates. To * keep it small, only radix-2 Cooley-Tukey algorithm is implemented, and only * half of the twiddle factors are stored. Although there are still ways to make * it even faster or smaller, it costs too much on one of the aspects. */ #include <stdio.h> #include <stdint.h> #ifdef __arm__ #include <machine/cpu-features.h> #endif #define LOG_FFT_SIZE 10 #define MAX_FFT_SIZE (1 << LOG_FFT_SIZE) static const int32_t twiddle[MAX_FFT_SIZE / 4] = { 0x00008000, 0xff378001, 0xfe6e8002, 0xfda58006, 0xfcdc800a, 0xfc13800f, 0xfb4a8016, 0xfa81801e, 0xf9b88027, 0xf8ef8032, 0xf827803e, 0xf75e804b, 0xf6958059, 0xf5cd8068, 0xf5058079, 0xf43c808b, 0xf374809e, 0xf2ac80b2, 0xf1e480c8, 0xf11c80de, 0xf05580f6, 0xef8d8110, 0xeec6812a, 0xedff8146, 0xed388163, 0xec718181, 0xebab81a0, 0xeae481c1, 0xea1e81e2, 0xe9588205, 0xe892822a, 0xe7cd824f, 0xe7078276, 0xe642829d, 0xe57d82c6, 0xe4b982f1, 0xe3f4831c, 0xe3308349, 0xe26d8377, 0xe1a983a6, 0xe0e683d6, 0xe0238407, 0xdf61843a, 0xde9e846e, 0xdddc84a3, 0xdd1b84d9, 0xdc598511, 0xdb998549, 0xdad88583, 0xda1885be, 0xd95885fa, 0xd8988637, 0xd7d98676, 0xd71b86b6, 0xd65c86f6, 0xd59e8738, 0xd4e1877b, 0xd42487c0, 0xd3678805, 0xd2ab884c, 0xd1ef8894, 0xd13488dd, 0xd0798927, 0xcfbe8972, 0xcf0489be, 0xce4b8a0c, 0xcd928a5a, 0xccd98aaa, 0xcc218afb, 0xcb698b4d, 0xcab28ba0, 0xc9fc8bf5, 0xc9468c4a, 0xc8908ca1, 0xc7db8cf8, 0xc7278d51, 0xc6738dab, 0xc5c08e06, 0xc50d8e62, 0xc45b8ebf, 0xc3a98f1d, 0xc2f88f7d, 0xc2488fdd, 0xc198903e, 0xc0e990a1, 0xc03a9105, 0xbf8c9169, 0xbedf91cf, 0xbe329236, 0xbd86929e, 0xbcda9307, 0xbc2f9371, 0xbb8593dc, 0xbadc9448, 0xba3394b5, 0xb98b9523, 0xb8e39592, 0xb83c9603, 0xb7969674, 0xb6f196e6, 0xb64c9759, 0xb5a897ce, 0xb5059843, 0xb46298b9, 0xb3c09930, 0xb31f99a9, 0xb27f9a22, 0xb1df9a9c, 0xb1409b17, 0xb0a29b94, 0xb0059c11, 0xaf689c8f, 0xaecc9d0e, 0xae319d8e, 0xad979e0f, 0xacfd9e91, 0xac659f14, 0xabcd9f98, 0xab36a01c, 0xaaa0a0a2, 0xaa0aa129, 0xa976a1b0, 0xa8e2a238, 0xa84fa2c2, 0xa7bda34c, 0xa72ca3d7, 0xa69ca463, 0xa60ca4f0, 0xa57ea57e, 0xa4f0a60c, 0xa463a69c, 0xa3d7a72c, 0xa34ca7bd, 0xa2c2a84f, 0xa238a8e2, 0xa1b0a976, 0xa129aa0a, 0xa0a2aaa0, 0xa01cab36, 0x9f98abcd, 0x9f14ac65, 0x9e91acfd, 0x9e0fad97, 0x9d8eae31, 0x9d0eaecc, 0x9c8faf68, 0x9c11b005, 0x9b94b0a2, 0x9b17b140, 0x9a9cb1df, 0x9a22b27f, 0x99a9b31f, 0x9930b3c0, 0x98b9b462, 0x9843b505, 0x97ceb5a8, 0x9759b64c, 0x96e6b6f1, 0x9674b796, 0x9603b83c, 0x9592b8e3, 0x9523b98b, 0x94b5ba33, 0x9448badc, 0x93dcbb85, 0x9371bc2f, 0x9307bcda, 0x929ebd86, 0x9236be32, 0x91cfbedf, 0x9169bf8c, 0x9105c03a, 0x90a1c0e9, 0x903ec198, 0x8fddc248, 0x8f7dc2f8, 0x8f1dc3a9, 0x8ebfc45b, 0x8e62c50d, 0x8e06c5c0, 0x8dabc673, 0x8d51c727, 0x8cf8c7db, 0x8ca1c890, 0x8c4ac946, 0x8bf5c9fc, 0x8ba0cab2, 0x8b4dcb69, 0x8afbcc21, 0x8aaaccd9, 0x8a5acd92, 0x8a0cce4b, 0x89becf04, 0x8972cfbe, 0x8927d079, 0x88ddd134, 0x8894d1ef, 0x884cd2ab, 0x8805d367, 0x87c0d424, 0x877bd4e1, 0x8738d59e, 0x86f6d65c, 0x86b6d71b, 0x8676d7d9, 0x8637d898, 0x85fad958, 0x85beda18, 0x8583dad8, 0x8549db99, 0x8511dc59, 0x84d9dd1b, 0x84a3dddc, 0x846ede9e, 0x843adf61, 0x8407e023, 0x83d6e0e6, 0x83a6e1a9, 0x8377e26d, 0x8349e330, 0x831ce3f4, 0x82f1e4b9, 0x82c6e57d, 0x829de642, 0x8276e707, 0x824fe7cd, 0x822ae892, 0x8205e958, 0x81e2ea1e, 0x81c1eae4, 0x81a0ebab, 0x8181ec71, 0x8163ed38, 0x8146edff, 0x812aeec6, 0x8110ef8d, 0x80f6f055, 0x80def11c, 0x80c8f1e4, 0x80b2f2ac, 0x809ef374, 0x808bf43c, 0x8079f505, 0x8068f5cd, 0x8059f695, 0x804bf75e, 0x803ef827, 0x8032f8ef, 0x8027f9b8, 0x801efa81, 0x8016fb4a, 0x800ffc13, 0x800afcdc, 0x8006fda5, 0x8002fe6e, 0x8001ff37, }; /* Returns the multiplication of \conj{a} and {b}. */ static inline int32_t mult(int32_t a, int32_t b) { #if __ARM_ARCH__ >= 6 int32_t t = b; __asm__("smuad %0, %0, %1" : "+r" (t) : "r" (a)); __asm__("smusdx %0, %0, %1" : "+r" (b) : "r" (a)); __asm__("pkhtb %0, %0, %1, ASR #16" : "+r" (t) : "r" (b)); return t; #else return (((a >> 16) * (b >> 16) + (int16_t)a * (int16_t)b) & ~0xFFFF) | ((((a >> 16) * (int16_t)b - (int16_t)a * (b >> 16)) >> 16) & 0xFFFF); #endif } static inline int32_t half(int32_t a) { #if __ARM_ARCH__ >= 6 __asm__("shadd16 %0, %0, %1" : "+r" (a) : "r" (0)); return a; #else return ((a >> 1) & ~0x8000) | (a & 0x8000); #endif } void fixed_fft(int n, int32_t *v) { int scale = LOG_FFT_SIZE, i, p, r; for (r = 0, i = 1; i < n; ++i) { for (p = n; !(p & r); p >>= 1, r ^= p); if (i < r) { int32_t t = v[i]; v[i] = v[r]; v[r] = t; } } for (p = 1; p < n; p <<= 1) { --scale; for (i = 0; i < n; i += p << 1) { int32_t x = half(v[i]); int32_t y = half(v[i + p]); v[i] = x + y; v[i + p] = x - y; } for (r = 1; r < p; ++r) { int32_t w = MAX_FFT_SIZE / 4 - (r << scale); i = w >> 31; w = twiddle[(w ^ i) - i] ^ (i << 16); for (i = r; i < n; i += p << 1) { int32_t x = half(v[i]); int32_t y = mult(w, v[i + p]); v[i] = x - y; v[i + p] = x + y; } } } } void fixed_fft_real(int n, int32_t *v) { int scale = LOG_FFT_SIZE, m = n >> 1, i; fixed_fft(n, v); for (i = 1; i <= n; i <<= 1, --scale); v[0] = mult(~v[0], 0x80008000); v[m] = half(v[m]); for (i = 1; i < n >> 1; ++i) { int32_t x = half(v[i]); int32_t z = half(v[n - i]); int32_t y = z - (x ^ 0xFFFF); x = half(x + (z ^ 0xFFFF)); y = mult(y, twiddle[i << scale]); v[i] = x - y; v[n - i] = (x + y) ^ 0xFFFF; } }