ref: 39b71fb516bf18304e0561d316ce2ce82814a4dd
dir: /src/deemph.plt/
# 15/50us EIAJ de-emphasis filter for CD/DAT # # 09/02/98 (c) Heiko Eissfeldt # # 18/03/07 robs@users.sourceforge.net: changed to biquad for better accuracy. # # 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) # ^ # | # |~10dB _________________ # | / # | / | # | 20dB / decade ->/ | # | / | # |____________________/_ _ |_ _ _ _ _ _ _ _ _ Frequency # |0 dB | | # | | | # | | | # 3.1kHz ~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. # # This is the gnuplot file for the frequency response of the deemphasis. # # The absolute error is <=0.04dB up to ~12kHz, and <=0.06dB up to 20kHz. # First define the ideal filter: # Filter parameters T=1./441000. # we use the tenfold sampling frequency OmegaU=1./15e-6 OmegaL=15./50.*OmegaU # Calculate filter coefficients V0=OmegaL/OmegaU H0=V0 - 1. B=V0*tan(OmegaU*T/2.) 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 # Ideal transfer function Hi(f)=b0*sqrt((1 + 2*cos(f*o)*D + D*D)/(1 + 2*cos(f*o)*a1 + a1*a1)) # Now use a biquad (RBJ high shelf) with sampling frequency of 44100 Hz # to approximate the ideal curve: # Filter parameters m_t=1./44100. m_gain=-9.477 m_slope=.4845 m_f0=5283 # Calculate filter coefficients m_A=exp(m_gain/40.*log(10.)) m_w0=2.*pi*m_f0*m_t m_alpha=sin(m_w0)/2.*sqrt((m_A+1./m_A)*(1./m_slope-1.)+2.) m_b0=m_A*((m_A+1.)+(m_A-1.)*cos(m_w0)+2.*sqrt(m_A)*m_alpha) m_b1=-2.*m_A*((m_A-1.)+(m_A+1.)*cos(m_w0)) m_b2=m_A*((m_A+1.)+(m_A-1.)*cos(m_w0)-2.*sqrt(m_A)*m_alpha) m_a0=(m_A+1.)-(m_A-1.)*cos(m_w0)+2.*sqrt(m_A)*m_alpha m_a1=2.*((m_A-1.)-(m_A+1.)*cos(m_w0)) m_a2=(m_A+1.)-(m_A-1.)*cos(m_w0)-2.*sqrt(m_A)*m_alpha m_b2=m_b2/m_a0 m_b1=m_b1/m_a0 m_b0=m_b0/m_a0 m_a2=m_a2/m_a0 m_a1=m_a1/m_a0 # helper variables m_o=2*pi*m_t # Best fit transfer function Hb(f)=sqrt(\ (m_b0*m_b0 + m_b1*m_b1 + m_b2*m_b2 +\ 2.*(m_b0*m_b1 + m_b1*m_b2)*cos(f*m_o) +\ 2.*(m_b0*m_b2)* cos(2.*f*m_o)) /\ (1. + m_a1*m_a1 + m_a2*m_a2 +\ 2.*(m_a1 + m_a1*m_a2)*cos(f*m_o) +\ 2.*m_a2*cos(2.*f*m_o))) # plot real, best, ideal, level with halved attenuation, # level at full attentuation, 10fold magnified error set logscale x set grid xtics ytics mxtics mytics set key left bottom plot [f=1000:20000] [-12:2] \ 20*log10(Hi(f)),\ 20*log10(Hb(f)),\ 20*log10(OmegaL/(2* pi*f)),\ 0.5*20*log10(V0),\ 20*log10(V0),\ 200*log10(Hb(f)/Hi(f)) pause -1 "Hit return to continue"