/* Copyright (c) 2007-2008 CSIRO Copyright (c) 2007-2008 Xiph.Org Foundation Written by Jean-Marc Valin */ /* Redistribution and use in source and binary forms, with or without modification, are permitted provided that the following conditions are met: - Redistributions of source code must retain the above copyright notice, this list of conditions and the following disclaimer. - Redistributions in binary form must reproduce the above copyright notice, this list of conditions and the following disclaimer in the documentation and/or other materials provided with the distribution. THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS ``AS IS'' AND ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. */ /* This is a simple MDCT implementation that uses a N/4 complex FFT to do most of the work. It should be relatively straightforward to plug in pretty much and FFT here. This replaces the Vorbis FFT (and uses the exact same API), which was a bit too messy and that was ending up duplicating code (might as well use the same FFT everywhere). The algorithm is similar to (and inspired from) Fabrice Bellard's MDCT implementation in FFMPEG, but has differences in signs, ordering and scaling in many places. */ #ifndef SKIP_CONFIG_H #ifdef OPUS_ENABLED #include "opus/opus_config.h" #endif #endif #include "opus/celt/mdct.h" #include "opus/celt/kiss_fft.h" #include "opus/celt/_kiss_fft_guts.h" #include #include "opus/celt/os_support.h" #include "opus/celt/mathops.h" #include "opus/celt/stack_alloc.h" #ifdef CUSTOM_MODES int clt_mdct_init(celt_mdct_lookup *l,int N, int maxshift) { int i; int N4; kiss_twiddle_scalar *trig; #if defined(OPUS_FIXED_POINT) int N2=N>>1; #endif l->n = N; N4 = N>>2; l->maxshift = maxshift; for (i=0;i<=maxshift;i++) { if (i==0) l->kfft[i] = opus_fft_alloc(N>>2>>i, 0, 0); else l->kfft[i] = opus_fft_alloc_twiddles(N>>2>>i, 0, 0, l->kfft[0]); #ifndef ENABLE_TI_DSPLIB55 if (l->kfft[i]==NULL) return 0; #endif } l->trig = trig = (kiss_twiddle_scalar*)opus_alloc((N4+1)*sizeof(kiss_twiddle_scalar)); if (l->trig==NULL) return 0; /* We have enough points that sine isn't necessary */ #if defined(OPUS_FIXED_POINT) for (i=0;i<=N4;i++) trig[i] = TRIG_UPSCALE*celt_cos_norm(DIV32(ADD32(SHL32(EXTEND32(i),17),N2),N)); #else for (i=0;i<=N4;i++) trig[i] = (kiss_twiddle_scalar)cos(2*PI*i/N); #endif return 1; } void clt_mdct_clear(celt_mdct_lookup *l) { int i; for (i=0;i<=l->maxshift;i++) opus_fft_free(l->kfft[i]); opus_free((kiss_twiddle_scalar*)l->trig); } #endif /* CUSTOM_MODES */ /* Forward MDCT trashes the input array */ void clt_mdct_forward(const celt_mdct_lookup *l, kiss_fft_scalar *in, kiss_fft_scalar * OPUS_RESTRICT out, const opus_val16 *window, int overlap, int shift, int stride) { int i; int N, N2, N4; kiss_twiddle_scalar sine; VARDECL(kiss_fft_scalar, f); VARDECL(kiss_fft_scalar, f2); SAVE_STACK; N = l->n; N >>= shift; N2 = N>>1; N4 = N>>2; ALLOC(f, N2, kiss_fft_scalar); ALLOC(f2, N2, kiss_fft_scalar); /* sin(x) ~= x here */ #ifdef OPUS_FIXED_POINT sine = TRIG_UPSCALE*(QCONST16(0.7853981f, 15)+N2)/N; #else sine = (kiss_twiddle_scalar)2*PI*(.125f)/N; #endif /* Consider the input to be composed of four blocks: [a, b, c, d] */ /* Window, shuffle, fold */ { /* Temp pointers to make it really clear to the compiler what we're doing */ const kiss_fft_scalar * OPUS_RESTRICT xp1 = in+(overlap>>1); const kiss_fft_scalar * OPUS_RESTRICT xp2 = in+N2-1+(overlap>>1); kiss_fft_scalar * OPUS_RESTRICT yp = f; const opus_val16 * OPUS_RESTRICT wp1 = window+(overlap>>1); const opus_val16 * OPUS_RESTRICT wp2 = window+(overlap>>1)-1; for(i=0;i<((overlap+3)>>2);i++) { /* Real part arranged as -d-cR, Imag part arranged as -b+aR*/ *yp++ = MULT16_32_Q15(*wp2, xp1[N2]) + MULT16_32_Q15(*wp1,*xp2); *yp++ = MULT16_32_Q15(*wp1, *xp1) - MULT16_32_Q15(*wp2, xp2[-N2]); xp1+=2; xp2-=2; wp1+=2; wp2-=2; } wp1 = window; wp2 = window+overlap-1; for(;i>2);i++) { /* Real part arranged as a-bR, Imag part arranged as -c-dR */ *yp++ = *xp2; *yp++ = *xp1; xp1+=2; xp2-=2; } for(;itrig[0]; for(i=0;ikfft[shift], (kiss_fft_cpx *)f, (kiss_fft_cpx *)f2); /* Post-rotate */ { /* Temp pointers to make it really clear to the compiler what we're doing */ const kiss_fft_scalar * OPUS_RESTRICT fp = f2; kiss_fft_scalar * OPUS_RESTRICT yp1 = out; kiss_fft_scalar * OPUS_RESTRICT yp2 = out+stride*(N2-1); const kiss_twiddle_scalar *t = &l->trig[0]; /* Temp pointers to make it really clear to the compiler what we're doing */ for(i=0;in; N >>= shift; N2 = N>>1; N4 = N>>2; ALLOC(f2, N2, kiss_fft_scalar); /* sin(x) ~= x here */ #ifdef OPUS_FIXED_POINT sine = TRIG_UPSCALE*(QCONST16(0.7853981f, 15)+N2)/N; #else sine = (kiss_twiddle_scalar)2*PI*(.125f)/N; #endif /* Pre-rotate */ { /* Temp pointers to make it really clear to the compiler what we're doing */ const kiss_fft_scalar * OPUS_RESTRICT xp1 = in; const kiss_fft_scalar * OPUS_RESTRICT xp2 = in+stride*(N2-1); kiss_fft_scalar * OPUS_RESTRICT yp = f2; const kiss_twiddle_scalar *t = &l->trig[0]; for(i=0;ikfft[shift], (kiss_fft_cpx *)f2, (kiss_fft_cpx *)(out+(overlap>>1))); /* Post-rotate and de-shuffle from both ends of the buffer at once to make it in-place. */ { kiss_fft_scalar * OPUS_RESTRICT yp0 = out+(overlap>>1); kiss_fft_scalar * OPUS_RESTRICT yp1 = out+(overlap>>1)+N2-2; const kiss_twiddle_scalar *t = &l->trig[0]; /* Loop to (N4+1)>>1 to handle odd N4. When N4 is odd, the middle pair will be computed twice. */ for(i=0;i<(N4+1)>>1;i++) { kiss_fft_scalar re, im, yr, yi; kiss_twiddle_scalar t0, t1; re = yp0[0]; im = yp0[1]; t0 = t[i<