X-Git-Url: https://git.sesse.net/?a=blobdiff_plain;f=libavcodec%2Flsp.c;h=f57f62135009e4715036d12ccb4794da1a04138b;hb=c325b5054f7cedb541ebd2f36059d7315a965d5f;hp=9a09f8d485b9d0ddee6190acbdfde317357fd798;hpb=8726882993df25c713ee51c2674492366ff84cfe;p=ffmpeg diff --git a/libavcodec/lsp.c b/libavcodec/lsp.c index 9a09f8d485b..f57f6213500 100644 --- a/libavcodec/lsp.c +++ b/libavcodec/lsp.c @@ -26,32 +26,32 @@ #define FRAC_BITS 14 #include "mathops.h" #include "lsp.h" -#include "acelp_math.h" +#include "celp_math.h" -void ff_acelp_reorder_lsf(int16_t* lsfq, int lsfq_min_distance, int lsfq_min, int lsfq_max) +void ff_acelp_reorder_lsf(int16_t* lsfq, int lsfq_min_distance, int lsfq_min, int lsfq_max, int lp_order) { int i, j; /* sort lsfq in ascending order. float bubble agorithm, O(n) if data already sorted, O(n^2) - otherwise */ - for(i=0; i<9; i++) + for(i=0; i=0 && lsfq[j] > lsfq[j+1]; j--) FFSWAP(int16_t, lsfq[j], lsfq[j+1]); - for(i=0;i<10; i++) + for(i=0; i> 15); // divide by PI and (0,13) -> (0,14) } @@ -61,60 +61,60 @@ void ff_acelp_lsf2lsp(int16_t *lsp, const int16_t *lsf) * \param f [out] decoded polynomial coefficients (-0x20000000 <= (3.22) <= 0x1fffffff) * \param lsp LSP coefficients (-0x8000 <= (0.15) <= 0x7fff) */ -static void lsp2poly(int* f, const int16_t* lsp) +static void lsp2poly(int* f, const int16_t* lsp, int lp_half_order) { int i, j; f[0] = 0x400000; // 1.0 in (3.22) f[1] = -lsp[0] << 8; // *2 and (0.15) -> (3.22) - for(i=2; i<=5; i++) + for(i=2; i<=lp_half_order; i++) { f[i] = f[i-2]; for(j=i; j>1; j--) - f[j] -= MULL(f[j-1], lsp[2*i-2]) - f[j-2]; // (3.22) * (0.15) * 2 -> (3.22) + f[j] -= MULL(f[j-1], lsp[2*i-2], FRAC_BITS) - f[j-2]; f[1] -= lsp[2*i-2] << 8; } } -void ff_acelp_lsp2lpc(int16_t* lp, const int16_t* lsp) +void ff_acelp_lsp2lpc(int16_t* lp, const int16_t* lsp, int lp_half_order) { int i; - int f1[6]; // (3.22) - int f2[6]; // (3.22) + int f1[lp_half_order+1]; // (3.22) + int f2[lp_half_order+1]; // (3.22) - lsp2poly(f1, lsp ); - lsp2poly(f2, lsp+1); + lsp2poly(f1, lsp , lp_half_order); + lsp2poly(f2, lsp+1, lp_half_order); /* 3.2.6 of G.729, Equations 25 and 26*/ lp[0] = 4096; - for(i=1; i<6; i++) + for(i=1; i> 11; // divide by 2 and (3.22) -> (3.12) - lp[11-i] = (ff1 - ff2) >> 11; // divide by 2 and (3.22) -> (3.12) + lp[(lp_half_order << 1) + 1 - i] = (ff1 - ff2) >> 11; // divide by 2 and (3.22) -> (3.12) } } -void ff_acelp_lp_decode(int16_t* lp_1st, int16_t* lp_2nd, const int16_t* lsp_2nd, const int16_t* lsp_prev) +void ff_acelp_lp_decode(int16_t* lp_1st, int16_t* lp_2nd, const int16_t* lsp_2nd, const int16_t* lsp_prev, int lp_order) { - int16_t lsp_1st[10]; // (0.15) + int16_t lsp_1st[lp_order]; // (0.15) int i; /* LSP values for first subframe (3.2.5 of G.729, Equation 24)*/ - for(i=0;i<10;i++) + for(i=0; i> 1) + (lsp_prev[i] >> 1); #else lsp_1st[i] = (lsp_2nd[i] + lsp_prev[i]) >> 1; #endif - ff_acelp_lsp2lpc(lp_1st, lsp_1st); + ff_acelp_lsp2lpc(lp_1st, lsp_1st, lp_order >> 1); /* LSP values for second subframe (3.2.5 of G.729)*/ - ff_acelp_lsp2lpc(lp_2nd, lsp_2nd); + ff_acelp_lsp2lpc(lp_2nd, lsp_2nd, lp_order >> 1); }