/proc/self/cwd/libfaad/mdct.c

Source (jump to first uncovered line)
/*
** FAAD2 - Freeware Advanced Audio (AAC) Decoder including SBR decoding
** Copyright (C) 2003-2005 M. Bakker, Nero AG, http://www.nero.com
**
** This program is free software; you can redistribute it and/or modify
** it under the terms of the GNU General Public License as published by
** the Free Software Foundation; either version 2 of the License, or
** (at your option) any later version.
**
** This program is distributed in the hope that it will be useful,
** but WITHOUT ANY WARRANTY; without even the implied warranty of
** MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
** GNU General Public License for more details.
**
** You should have received a copy of the GNU General Public License
** along with this program; if not, write to the Free Software
** Foundation, Inc., 59 Temple Place - Suite 330, Boston, MA 02111-1307, USA.
**
** Any non-GPL usage of this software or parts of this software is strictly
** forbidden.
**
** The "appropriate copyright message" mentioned in section 2c of the GPLv2
** must read: "Code from FAAD2 is copyright (c) Nero AG, www.nero.com"
**
** Commercial non-GPL licensing of this software is possible.
** For more info contact Nero AG through Mpeg4AAClicense@nero.com.
**
** $Id: mdct.c,v 1.47 2007/11/01 12:33:31 menno Exp $
**/

/*
 * Fast (I)MDCT Implementation using (I)FFT ((Inverse) Fast Fourier Transform)
 * and consists of three steps: pre-(I)FFT complex multiplication, complex
 * (I)FFT, post-(I)FFT complex multiplication,
 *
 * As described in:
 *  P. Duhamel, Y. Mahieux, and J.P. Petit, "A Fast Algorithm for the
 *  Implementation of Filter Banks Based on 'Time Domain Aliasing
 *  Cancellation'," IEEE Proc. on ICASSP'91, 1991, pp. 2209-2212.
 *
 *
 * As of April 6th 2002 completely rewritten.
 * This (I)MDCT can now be used for any data size n, where n is divisible by 8.
 *
 */

#include "common.h"
#include "structs.h"

#include <stdlib.h>
#ifdef _WIN32_WCE
#define assert(x)
#else
#include <assert.h>
#endif

#include "cfft.h"
#include "mdct.h"
#include "mdct_tab.h"


mdct_info *faad_mdct_init(uint16_t N)
{
    mdct_info *mdct = (mdct_info*)faad_malloc(sizeof(mdct_info));

    assert(N % 8 == 0);

    mdct->N = N;

    /* NOTE: For "small framelengths" in FIXED_POINT the coefficients need to be
     * scaled by sqrt("(nearest power of 2) > N" / N) */

    /* RE(mdct->sincos[k]) = scale*(real_t)(cos(2.0*M_PI*(k+1./8.) / (real_t)N));
     * IM(mdct->sincos[k]) = scale*(real_t)(sin(2.0*M_PI*(k+1./8.) / (real_t)N)); */
    /* scale is 1 for fixed point, sqrt(N) for floating point */
    switch (N)
    {
    case 2048: mdct->sincos = (complex_t*)mdct_tab_2048; break;
    case 256:  mdct->sincos = (complex_t*)mdct_tab_256;  break;
#ifdef LD_DEC
    case 1024: mdct->sincos = (complex_t*)mdct_tab_1024; break;
#endif
#ifdef ALLOW_SMALL_FRAMELENGTH
    case 1920: mdct->sincos = (complex_t*)mdct_tab_1920; break;
    case 240:  mdct->sincos = (complex_t*)mdct_tab_240;  break;
#ifdef LD_DEC
    case 960:  mdct->sincos = (complex_t*)mdct_tab_960;  break;
#endif
#endif
#ifdef SSR_DEC
    case 512:  mdct->sincos = (complex_t*)mdct_tab_512;  break;
    case 64:   mdct->sincos = (complex_t*)mdct_tab_64;   break;
#endif
    }

    /* initialise fft */
    mdct->cfft = cffti(N/4);

#ifdef PROFILE
    mdct->cycles = 0;
    mdct->fft_cycles = 0;
#endif

    return mdct;
}

void faad_mdct_end(mdct_info *mdct)
{
    if (mdct != NULL)
    {
#ifdef PROFILE
        printf("MDCT[%.4d]:         %I64d cycles\n", mdct->N, mdct->cycles);
        printf("CFFT[%.4d]:         %I64d cycles\n", mdct->N/4, mdct->fft_cycles);
#endif

        cfftu(mdct->cfft);

        faad_free(mdct);
    }
}

void faad_imdct(mdct_info *mdct, real_t *X_in, real_t *X_out)
{
    uint16_t k;

    complex_t x;
#ifdef ALLOW_SMALL_FRAMELENGTH
#ifdef FIXED_POINT
    real_t scale = 0, b_scale = 0;
#endif
#endif
    ALIGN complex_t Z1[512];
    complex_t *sincos = mdct->sincos;

    uint16_t N  = mdct->N;
    uint16_t N2 = N >> 1;
    uint16_t N4 = N >> 2;
    uint16_t N8 = N >> 3;

#ifdef PROFILE
    int64_t count1, count2 = faad_get_ts();
#endif

#ifdef ALLOW_SMALL_FRAMELENGTH
#ifdef FIXED_POINT
    /* detect non-power of 2 */
    if (N & (N-1))
    {
        /* adjust scale for non-power of 2 MDCT */
        /* 2048/1920 */
        b_scale = 1;
        scale = COEF_CONST(1.0666666666666667);
    }
#endif
#endif

    /* pre-IFFT complex multiplication */
    for (k = 0; k < N4; k++)
    {
        ComplexMult(&IM(Z1[k]), &RE(Z1[k]),
            X_in[2*k], X_in[N2 - 1 - 2*k], RE(sincos[k]), IM(sincos[k]));
    }

#ifdef PROFILE
    count1 = faad_get_ts();
#endif

    /* complex IFFT, any non-scaling FFT can be used here */
    cfftb(mdct->cfft, Z1);

#ifdef PROFILE
    count1 = faad_get_ts() - count1;
#endif

    /* post-IFFT complex multiplication */
    for (k = 0; k < N4; k++)
    {
        RE(x) = RE(Z1[k]);
        IM(x) = IM(Z1[k]);
        ComplexMult(&IM(Z1[k]), &RE(Z1[k]),
            IM(x), RE(x), RE(sincos[k]), IM(sincos[k]));

#ifdef ALLOW_SMALL_FRAMELENGTH
#ifdef FIXED_POINT
        /* non-power of 2 MDCT scaling */
        if (b_scale)
        {
            RE(Z1[k]) = MUL_C(RE(Z1[k]), scale);
            IM(Z1[k]) = MUL_C(IM(Z1[k]), scale);
        }
#endif
#endif
    }

    /* reordering */
    for (k = 0; k < N8; k+=2)
    {
        X_out[              2*k] =  IM(Z1[N8 +     k]);
        X_out[          2 + 2*k] =  IM(Z1[N8 + 1 + k]);

        X_out[          1 + 2*k] = -RE(Z1[N8 - 1 - k]);
        X_out[          3 + 2*k] = -RE(Z1[N8 - 2 - k]);

        X_out[N4 +          2*k] =  RE(Z1[         k]);
        X_out[N4 +    + 2 + 2*k] =  RE(Z1[     1 + k]);

        X_out[N4 +      1 + 2*k] = -IM(Z1[N4 - 1 - k]);
        X_out[N4 +      3 + 2*k] = -IM(Z1[N4 - 2 - k]);

        X_out[N2 +          2*k] =  RE(Z1[N8 +     k]);
        X_out[N2 +    + 2 + 2*k] =  RE(Z1[N8 + 1 + k]);

        X_out[N2 +      1 + 2*k] = -IM(Z1[N8 - 1 - k]);
        X_out[N2 +      3 + 2*k] = -IM(Z1[N8 - 2 - k]);

        X_out[N2 + N4 +     2*k] = -IM(Z1[         k]);
        X_out[N2 + N4 + 2 + 2*k] = -IM(Z1[     1 + k]);

        X_out[N2 + N4 + 1 + 2*k] =  RE(Z1[N4 - 1 - k]);
        X_out[N2 + N4 + 3 + 2*k] =  RE(Z1[N4 - 2 - k]);
    }

#ifdef PROFILE
    count2 = faad_get_ts() - count2;
    mdct->fft_cycles += count1;
    mdct->cycles += (count2 - count1);
#endif
}

#ifdef LTP_DEC
void faad_mdct(mdct_info *mdct, real_t *X_in, real_t *X_out)
{
    uint16_t k;

    complex_t x;
    ALIGN complex_t Z1[512];
    complex_t *sincos = mdct->sincos;

    uint16_t N  = mdct->N;
    uint16_t N2 = N >> 1;
    uint16_t N4 = N >> 2;
    uint16_t N8 = N >> 3;

#ifndef FIXED_POINT
  real_t scale = REAL_CONST(N);
#else
  real_t scale = REAL_CONST(4.0/N);
#endif

#ifdef ALLOW_SMALL_FRAMELENGTH
#ifdef FIXED_POINT
    /* detect non-power of 2 */
    if (N & (N-1))
    {
        /* adjust scale for non-power of 2 MDCT */
        /* *= sqrt(2048/1920) */
        scale = MUL_C(scale, COEF_CONST(1.0327955589886444));
    }
#endif
#endif

    /* pre-FFT complex multiplication */
    for (k = 0; k < N8; k++)
    {
        uint16_t n = k << 1;
        RE(x) = X_in[N - N4 - 1 - n] + X_in[N - N4 +     n];
        IM(x) = X_in[    N4 +     n] - X_in[    N4 - 1 - n];

        ComplexMult(&RE(Z1[k]), &IM(Z1[k]),
            RE(x), IM(x), RE(sincos[k]), IM(sincos[k]));

        RE(Z1[k]) = MUL_R(RE(Z1[k]), scale);
        IM(Z1[k]) = MUL_R(IM(Z1[k]), scale);

        RE(x) =  X_in[N2 - 1 - n] - X_in[        n];
        IM(x) =  X_in[N2 +     n] + X_in[N - 1 - n];

        ComplexMult(&RE(Z1[k + N8]), &IM(Z1[k + N8]),
            RE(x), IM(x), RE(sincos[k + N8]), IM(sincos[k + N8]));

        RE(Z1[k + N8]) = MUL_R(RE(Z1[k + N8]), scale);
        IM(Z1[k + N8]) = MUL_R(IM(Z1[k + N8]), scale);
    }

    /* complex FFT, any non-scaling FFT can be used here  */
    cfftf(mdct->cfft, Z1);

    /* post-FFT complex multiplication */
    for (k = 0; k < N4; k++)
    {
        uint16_t n = k << 1;
        ComplexMult(&RE(x), &IM(x),
            RE(Z1[k]), IM(Z1[k]), RE(sincos[k]), IM(sincos[k]));

        X_out[         n] = -RE(x);
        X_out[N2 - 1 - n] =  IM(x);
        X_out[N2 +     n] = -IM(x);
        X_out[N  - 1 - n] =  RE(x);
    }
}
#endif

Coverage Report

Created: 2025-07-11 06:39

Line	Count	Source (jump to first uncovered line)
1		/*
2		** FAAD2 - Freeware Advanced Audio (AAC) Decoder including SBR decoding
3		** Copyright (C) 2003-2005 M. Bakker, Nero AG, http://www.nero.com
4		**
5		** This program is free software; you can redistribute it and/or modify
6		** it under the terms of the GNU General Public License as published by
7		** the Free Software Foundation; either version 2 of the License, or
8		** (at your option) any later version.
9		**
10		** This program is distributed in the hope that it will be useful,
11		** but WITHOUT ANY WARRANTY; without even the implied warranty of
12		** MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
13		** GNU General Public License for more details.
14		**
15		** You should have received a copy of the GNU General Public License
16		** along with this program; if not, write to the Free Software
17		** Foundation, Inc., 59 Temple Place - Suite 330, Boston, MA 02111-1307, USA.
18		**
19		** Any non-GPL usage of this software or parts of this software is strictly
20		** forbidden.
21		**
22		** The "appropriate copyright message" mentioned in section 2c of the GPLv2
23		** must read: "Code from FAAD2 is copyright (c) Nero AG, www.nero.com"
24		**
25		** Commercial non-GPL licensing of this software is possible.
26		** For more info contact Nero AG through Mpeg4AAClicense@nero.com.
27		**
28		** $Id: mdct.c,v 1.47 2007/11/01 12:33:31 menno Exp $
29		**/
30
31		/*
32		* Fast (I)MDCT Implementation using (I)FFT ((Inverse) Fast Fourier Transform)
33		* and consists of three steps: pre-(I)FFT complex multiplication, complex
34		* (I)FFT, post-(I)FFT complex multiplication,
35		*
36		* As described in:
37		* P. Duhamel, Y. Mahieux, and J.P. Petit, "A Fast Algorithm for the
38		* Implementation of Filter Banks Based on 'Time Domain Aliasing
39		* Cancellation'," IEEE Proc. on ICASSP'91, 1991, pp. 2209-2212.
40		*
41		*
42		* As of April 6th 2002 completely rewritten.
43		* This (I)MDCT can now be used for any data size n, where n is divisible by 8.
44		*
45		*/
46
47		#include "common.h"
48		#include "structs.h"
49
50		#include <stdlib.h>
51		#ifdef _WIN32_WCE
52		#define assert(x)
53		#else
54		#include <assert.h>
55		#endif
56
57		#include "cfft.h"
58		#include "mdct.h"
59		#include "mdct_tab.h"
60
61
62		mdct_info *faad_mdct_init(uint16_t N)
63	15.9k	{
64	15.9k	mdct_info mdct = (mdct_info)faad_malloc(sizeof(mdct_info));
65
66	15.9k	assert(N % 8 == 0);
67
68	15.9k	mdct->N = N;
69
70		/* NOTE: For "small framelengths" in FIXED_POINT the coefficients need to be
71		* scaled by sqrt("(nearest power of 2) > N" / N) */
72
73		/* RE(mdct->sincos[k]) = scale(real_t)(cos(2.0M_PI*(k+1./8.) / (real_t)N));
74		* IM(mdct->sincos[k]) = scale(real_t)(sin(2.0M_PI(k+1./8.) / (real_t)N)); /
75		/* scale is 1 for fixed point, sqrt(N) for floating point */
76	15.9k	switch (N)
77	15.9k	{
78	6.05k	case 2048: mdct->sincos = (complex_t*)mdct_tab_2048; break;
79	6.05k	case 256: mdct->sincos = (complex_t*)mdct_tab_256; break;
80		#ifdef LD_DEC
81		case 1024: mdct->sincos = (complex_t*)mdct_tab_1024; break;
82		#endif
83	0	#ifdef ALLOW_SMALL_FRAMELENGTH
84	1.94k	case 1920: mdct->sincos = (complex_t*)mdct_tab_1920; break;
85	1.94k	case 240: mdct->sincos = (complex_t*)mdct_tab_240; break;
86		#ifdef LD_DEC
87		case 960: mdct->sincos = (complex_t*)mdct_tab_960; break;
88		#endif
89	15.9k	#endif
90		#ifdef SSR_DEC
91		case 512: mdct->sincos = (complex_t*)mdct_tab_512; break;
92		case 64: mdct->sincos = (complex_t*)mdct_tab_64; break;
93		#endif
94	15.9k	}
95
96		/* initialise fft */
97	15.9k	mdct->cfft = cffti(N/4);
98
99		#ifdef PROFILE
100		mdct->cycles = 0;
101		mdct->fft_cycles = 0;
102		#endif
103
104	15.9k	return mdct;
105	15.9k	}
106
107		void faad_mdct_end(mdct_info *mdct)
108	15.9k	{
109	15.9k	if (mdct != NULL)
110	15.9k	{
111		#ifdef PROFILE
112		printf("MDCT[%.4d]: %I64d cycles\n", mdct->N, mdct->cycles);
113		printf("CFFT[%.4d]: %I64d cycles\n", mdct->N/4, mdct->fft_cycles);
114		#endif
115
116	15.9k	cfftu(mdct->cfft);
117
118	15.9k	faad_free(mdct);
119	15.9k	}
120	15.9k	}
121
122		void faad_imdct(mdct_info mdct, real_t X_in, real_t *X_out)
123	255k	{
124	255k	uint16_t k;
125
126	255k	complex_t x;
127	255k	#ifdef ALLOW_SMALL_FRAMELENGTH
128		#ifdef FIXED_POINT
129		real_t scale = 0, b_scale = 0;
130		#endif
131	255k	#endif
132	255k	ALIGN complex_t Z1[512];
133	255k	complex_t *sincos = mdct->sincos;
134
135	255k	uint16_t N = mdct->N;
136	255k	uint16_t N2 = N >> 1;
137	255k	uint16_t N4 = N >> 2;
138	255k	uint16_t N8 = N >> 3;
139
140		#ifdef PROFILE
141		int64_t count1, count2 = faad_get_ts();
142		#endif
143
144	255k	#ifdef ALLOW_SMALL_FRAMELENGTH
145		#ifdef FIXED_POINT
146		/* detect non-power of 2 */
147		if (N & (N-1))
148		{
149		/* adjust scale for non-power of 2 MDCT */
150		/* 2048/1920 */
151		b_scale = 1;
152		scale = COEF_CONST(1.0666666666666667);
153		}
154		#endif
155	255k	#endif
156
157		/* pre-IFFT complex multiplication */
158	73.1M	for (k = 0; k < N4; k++)
159	72.8M	{
160	72.8M	ComplexMult(&IM(Z1[k]), &RE(Z1[k]),
161	72.8M	X_in[2k], X_in[N2 - 1 - 2k], RE(sincos[k]), IM(sincos[k]));
162	72.8M	}
163
164		#ifdef PROFILE
165		count1 = faad_get_ts();
166		#endif
167
168		/* complex IFFT, any non-scaling FFT can be used here */
169	255k	cfftb(mdct->cfft, Z1);
170
171		#ifdef PROFILE
172		count1 = faad_get_ts() - count1;
173		#endif
174
175		/* post-IFFT complex multiplication */
176	73.1M	for (k = 0; k < N4; k++)
177	72.8M	{
178	72.8M	RE(x) = RE(Z1[k]);
179	72.8M	IM(x) = IM(Z1[k]);
180	72.8M	ComplexMult(&IM(Z1[k]), &RE(Z1[k]),
181	72.8M	IM(x), RE(x), RE(sincos[k]), IM(sincos[k]));
182
183	72.8M	#ifdef ALLOW_SMALL_FRAMELENGTH
184		#ifdef FIXED_POINT
185		/* non-power of 2 MDCT scaling */
186		if (b_scale)
187		{
188		RE(Z1[k]) = MUL_C(RE(Z1[k]), scale);
189		IM(Z1[k]) = MUL_C(IM(Z1[k]), scale);
190		}
191		#endif
192	72.8M	#endif
193	72.8M	}
194
195		/* reordering */
196	18.4M	for (k = 0; k < N8; k+=2)
197	18.2M	{
198	18.2M	X_out[ 2*k] = IM(Z1[N8 + k]);
199	18.2M	X_out[ 2 + 2*k] = IM(Z1[N8 + 1 + k]);
200
201	18.2M	X_out[ 1 + 2*k] = -RE(Z1[N8 - 1 - k]);
202	18.2M	X_out[ 3 + 2*k] = -RE(Z1[N8 - 2 - k]);
203
204	18.2M	X_out[N4 + 2*k] = RE(Z1[ k]);
205	18.2M	X_out[N4 + + 2 + 2*k] = RE(Z1[ 1 + k]);
206
207	18.2M	X_out[N4 + 1 + 2*k] = -IM(Z1[N4 - 1 - k]);
208	18.2M	X_out[N4 + 3 + 2*k] = -IM(Z1[N4 - 2 - k]);
209
210	18.2M	X_out[N2 + 2*k] = RE(Z1[N8 + k]);
211	18.2M	X_out[N2 + + 2 + 2*k] = RE(Z1[N8 + 1 + k]);
212
213	18.2M	X_out[N2 + 1 + 2*k] = -IM(Z1[N8 - 1 - k]);
214	18.2M	X_out[N2 + 3 + 2*k] = -IM(Z1[N8 - 2 - k]);
215
216	18.2M	X_out[N2 + N4 + 2*k] = -IM(Z1[ k]);
217	18.2M	X_out[N2 + N4 + 2 + 2*k] = -IM(Z1[ 1 + k]);
218
219	18.2M	X_out[N2 + N4 + 1 + 2*k] = RE(Z1[N4 - 1 - k]);
220	18.2M	X_out[N2 + N4 + 3 + 2*k] = RE(Z1[N4 - 2 - k]);
221	18.2M	}
222
223		#ifdef PROFILE
224		count2 = faad_get_ts() - count2;
225		mdct->fft_cycles += count1;
226		mdct->cycles += (count2 - count1);
227		#endif
228	255k	}
229
230		#ifdef LTP_DEC
231		void faad_mdct(mdct_info mdct, real_t X_in, real_t *X_out)
232		{
233		uint16_t k;
234
235		complex_t x;
236		ALIGN complex_t Z1[512];
237		complex_t *sincos = mdct->sincos;
238
239		uint16_t N = mdct->N;
240		uint16_t N2 = N >> 1;
241		uint16_t N4 = N >> 2;
242		uint16_t N8 = N >> 3;
243
244		#ifndef FIXED_POINT
245		real_t scale = REAL_CONST(N);
246		#else
247		real_t scale = REAL_CONST(4.0/N);
248		#endif
249
250		#ifdef ALLOW_SMALL_FRAMELENGTH
251		#ifdef FIXED_POINT
252		/* detect non-power of 2 */
253		if (N & (N-1))
254		{
255		/* adjust scale for non-power of 2 MDCT */
256		/* = sqrt(2048/1920) /
257		scale = MUL_C(scale, COEF_CONST(1.0327955589886444));
258		}
259		#endif
260		#endif
261
262		/* pre-FFT complex multiplication */
263		for (k = 0; k < N8; k++)
264		{
265		uint16_t n = k << 1;
266		RE(x) = X_in[N - N4 - 1 - n] + X_in[N - N4 + n];
267		IM(x) = X_in[ N4 + n] - X_in[ N4 - 1 - n];
268
269		ComplexMult(&RE(Z1[k]), &IM(Z1[k]),
270		RE(x), IM(x), RE(sincos[k]), IM(sincos[k]));
271
272		RE(Z1[k]) = MUL_R(RE(Z1[k]), scale);
273		IM(Z1[k]) = MUL_R(IM(Z1[k]), scale);
274
275		RE(x) = X_in[N2 - 1 - n] - X_in[ n];
276		IM(x) = X_in[N2 + n] + X_in[N - 1 - n];
277
278		ComplexMult(&RE(Z1[k + N8]), &IM(Z1[k + N8]),
279		RE(x), IM(x), RE(sincos[k + N8]), IM(sincos[k + N8]));
280
281		RE(Z1[k + N8]) = MUL_R(RE(Z1[k + N8]), scale);
282		IM(Z1[k + N8]) = MUL_R(IM(Z1[k + N8]), scale);
283		}
284
285		/* complex FFT, any non-scaling FFT can be used here */
286		cfftf(mdct->cfft, Z1);
287
288		/* post-FFT complex multiplication */
289		for (k = 0; k < N4; k++)
290		{
291		uint16_t n = k << 1;
292		ComplexMult(&RE(x), &IM(x),
293		RE(Z1[k]), IM(Z1[k]), RE(sincos[k]), IM(sincos[k]));
294
295		X_out[ n] = -RE(x);
296		X_out[N2 - 1 - n] = IM(x);
297		X_out[N2 + n] = -IM(x);
298		X_out[N - 1 - n] = RE(x);
299		}
300		}
301		#endif