#include "config.h" #include #include "AL/alc.h" #include "AL/al.h" #include "alMain.h" #include "biquad.h" template void BiquadFilterR::setParams(BiquadType type, Real gain, Real f0norm, Real rcpQ) { // Limit gain to -100dB assert(gain > 0.00001f); const Real w0{al::MathDefs::Tau() * f0norm}; const Real sin_w0{std::sin(w0)}; const Real cos_w0{std::cos(w0)}; const Real alpha{sin_w0/2.0f * rcpQ}; Real sqrtgain_alpha_2; Real a[3]{ 1.0f, 0.0f, 0.0f }; Real b[3]{ 1.0f, 0.0f, 0.0f }; /* Calculate filter coefficients depending on filter type */ switch(type) { case BiquadType::HighShelf: sqrtgain_alpha_2 = 2.0f * std::sqrt(gain) * alpha; b[0] = gain*((gain+1.0f) + (gain-1.0f)*cos_w0 + sqrtgain_alpha_2); b[1] = -2.0f*gain*((gain-1.0f) + (gain+1.0f)*cos_w0 ); b[2] = gain*((gain+1.0f) + (gain-1.0f)*cos_w0 - sqrtgain_alpha_2); a[0] = (gain+1.0f) - (gain-1.0f)*cos_w0 + sqrtgain_alpha_2; a[1] = 2.0f* ((gain-1.0f) - (gain+1.0f)*cos_w0 ); a[2] = (gain+1.0f) - (gain-1.0f)*cos_w0 - sqrtgain_alpha_2; break; case BiquadType::LowShelf: sqrtgain_alpha_2 = 2.0f * std::sqrt(gain) * alpha; b[0] = gain*((gain+1.0f) - (gain-1.0f)*cos_w0 + sqrtgain_alpha_2); b[1] = 2.0f*gain*((gain-1.0f) - (gain+1.0f)*cos_w0 ); b[2] = gain*((gain+1.0f) - (gain-1.0f)*cos_w0 - sqrtgain_alpha_2); a[0] = (gain+1.0f) + (gain-1.0f)*cos_w0 + sqrtgain_alpha_2; a[1] = -2.0f* ((gain-1.0f) + (gain+1.0f)*cos_w0 ); a[2] = (gain+1.0f) + (gain-1.0f)*cos_w0 - sqrtgain_alpha_2; break; case BiquadType::Peaking: gain = std::sqrt(gain); b[0] = 1.0f + alpha * gain; b[1] = -2.0f * cos_w0; b[2] = 1.0f - alpha * gain; a[0] = 1.0f + alpha / gain; a[1] = -2.0f * cos_w0; a[2] = 1.0f - alpha / gain; break; case BiquadType::LowPass: b[0] = (1.0f - cos_w0) / 2.0f; b[1] = 1.0f - cos_w0; b[2] = (1.0f - cos_w0) / 2.0f; a[0] = 1.0f + alpha; a[1] = -2.0f * cos_w0; a[2] = 1.0f - alpha; break; case BiquadType::HighPass: b[0] = (1.0f + cos_w0) / 2.0f; b[1] = -(1.0f + cos_w0); b[2] = (1.0f + cos_w0) / 2.0f; a[0] = 1.0f + alpha; a[1] = -2.0f * cos_w0; a[2] = 1.0f - alpha; break; case BiquadType::BandPass: b[0] = alpha; b[1] = 0.0f; b[2] = -alpha; a[0] = 1.0f + alpha; a[1] = -2.0f * cos_w0; a[2] = 1.0f - alpha; break; } a1 = a[1] / a[0]; a2 = a[2] / a[0]; b0 = b[0] / a[0]; b1 = b[1] / a[0]; b2 = b[2] / a[0]; } template void BiquadFilterR::process(Real *dst, const Real *src, int numsamples) { ASSUME(numsamples > 0); const Real b0{this->b0}; const Real b1{this->b1}; const Real b2{this->b2}; const Real a1{this->a1}; const Real a2{this->a2}; Real z1{this->z1}; Real z2{this->z2}; /* Processing loop is Transposed Direct Form II. This requires less storage * compared to Direct Form I (only two delay components, instead of a four- * sample history; the last two inputs and outputs), and works better for * floating-point which favors summing similarly-sized values while being * less bothered by overflow. * * See: http://www.earlevel.com/main/2003/02/28/biquads/ */ auto proc_sample = [b0,b1,b2,a1,a2,&z1,&z2](Real input) noexcept -> Real { Real output = input*b0 + z1; z1 = input*b1 - output*a1 + z2; z2 = input*b2 - output*a2; return output; }; std::transform(src, src+numsamples, dst, proc_sample); this->z1 = z1; this->z2 = z2; } template class BiquadFilterR; template class BiquadFilterR;