ref: 8dd76de3403b5b463f120575bb6b2e5c92a07e6e
dir: /src/deemph.h/
/* * July 5, 1991 * * Deemphases Filter * * Fixed deemphasis filter for processing pre-emphasized audio cd samples * 09/02/98 (c) Heiko Eissfeldt * License: LGPL (Lesser Gnu Public License) * * This implements the inverse filter of the optional pre-emphasis stage as * defined by ISO 908 (describing the audio cd format). * * Background: * In the early days of audio cds, there were recording problems * with noise (for example in classical recordings). The high dynamics * of audio cds exposed these recording errors a lot. * * The commonly used solution at that time was to 'pre-emphasize' the * trebles to have a better signal-noise-ratio. That is trebles were * amplified before recording, so that they would give a stronger * signal compared to the underlying (tape)noise. * * For that purpose the audio signal was prefiltered with the following * frequency response (simple first order filter): * * V (in dB) * ^ * | * | _________________ * | / * | / | * | 20 dB / decade ->/ | * | / | * |____________________/_ _ |_ _ _ _ _ _ _ _ _ _ _ _ _ lg f * |0 dB | | * | | | * | | | * 3.1KHz ca. 10KHz * * So the recorded audio signal has amplified trebles compared to the * original. * HiFi cd players do correct this by applying an inverse filter * automatically, the cd-rom drives or cd burners used by digital * sampling programs (like cdda2wav) however do not. * * So, this is what this effect does. * * Here is the gnuplot file for the frequency response of the deemphasis. The error is below +-0.1dB -------- Start of gnuplot file --------------------- # first define the ideal filter. We use the tenfold sampling frequency. T=1./441000. OmegaU=1./15E-6 OmegaL=15./50.*OmegaU V0=OmegaL/OmegaU H0=V0-1. B=V0*tan(OmegaU*T/2.) # the coefficients follow a1=(B - 1.)/(B + 1.) b0=(1.0 + (1.0 - a1) * H0/2.) b1=(a1 + (a1 - 1.0) * H0/2.) # helper variables D=b1/b0 o=2*pi*T H2(f)=b0*sqrt((1+2*cos(f*o)*D+D*D)/(1+2*cos(f*o)*a1+a1*a1)) # # now approximate the ideal curve with a fitted one for sampling frequency # of 44100 Hz. Fitting parameters are # amplification at high frequencies V02 # and tau of the upper edge frequency OmegaU2 = 2 *pi * f(upper) T2=1./44100. V02=0.3365 OmegaU2=1./19E-6 B2=V02*tan(OmegaU2*T2/2.) # the coefficients follow a12=(B2 - 1.)/(B2 + 1.) b02=(1.0 + (1.0 - a12) * (V02-1.)/2.) b12=(a12 + (a12 - 1.0) * (V02-1.)/2.) # helper variables D2=b12/b02 o2=2*pi*T2 H(f)=b02*sqrt((1+2*cos(f*o2)*D2+D2*D2)/(1+2*cos(f*o2)*a12+a12*a12)) # plot best, real, ideal, level with halved attenuation, # level at full attentuation, 10fold magnified error set logscale x set grid xtics ytics mxtics mytics plot [f=1000:20000] [-12:2] 20*log10(H(f)),20*log10(H2(f)), 20*log10(OmegaL/(2* pi*f)), 0.5*20*log10(V0), 20*log10(V0), 200*log10(H(f)/H2(f)) pause -1 "Hit return to continue" -------- End of gnuplot file --------------------- */ /* filter coefficients */ p->a1 = -0.62786881719628784282; p->b0 = 0.45995451989513153057; p->b1 = -0.08782333709141937339; /* The sample-rate must be 44100 as this has been harded coded into the * pre-calculated filter coefficients. */ if (effp->ininfo.rate != 44100) { st_fail("Sample rate must be 44100 (audio-CD)"); return ST_EOF; }