Mercurial > hg > aimc
view trunk/matlab/bmm/carfac/CARFAC_Design.m @ 516:68c15d43fcc8
Added MATLAB code for Lyon's CAR-FAC filter cascade.
| author | tom@acousticscale.org |
|---|---|
| date | Wed, 15 Feb 2012 21:26:40 +0000 |
| parents | |
| children | 2b96cb7ea4f7 |
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% Copyright 2012, Google, Inc. % Author: Richard F. Lyon % % This Matlab file is part of an implementation of Lyon's cochlear model: % "Cascade of Asymmetric Resonators with Fast-Acting Compression" % to supplement Lyon's upcoming book "Human and Machine Hearing" % % Licensed under the Apache License, Version 2.0 (the "License"); % you may not use this file except in compliance with the License. % You may obtain a copy of the License at % % http://www.apache.org/licenses/LICENSE-2.0 % % Unless required by applicable law or agreed to in writing, software % distributed under the License is distributed on an "AS IS" BASIS, % WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied. % See the License for the specific language governing permissions and % limitations under the License. function CF = CARFAC_Design(fs, CF_filter_params, ... CF_AGC_params, ERB_break_freq, ERB_Q, CF_IHC_params) % function CF = CARFAC_Design(fs, CF_filter_params, ... % CF_AGC_params, ERB_break_freq, ERB_Q, CF_IHC_params) % % This function designs the CARFAC (Cascade of Asymmetric Resonators with % Fast-Acting Compression); that is, it take bundles of parameters and % computes all the filter coefficients needed to run it. % % fs is sample rate (per second) % CF_filter_params bundles all the pole-zero filter cascade parameters % CF_AGC_params bundles all the automatic gain control parameters % CF_IHC_params bundles all the inner hair cell parameters % % See other functions for designing and characterizing the CARFAC: % [naps, CF] = CARFAC_Run(CF, input_waves) % transfns = CARFAC_Transfer_Functions(CF, to_channels, from_channels) % % Defaults to Glasberg & Moore's ERB curve: % ERB_break_freq = 1000/4.37; % 228.833 % ERB_Q = 1000/(24.7*4.37); % 9.2645 % % All args are defaultable; for sample/default args see the code; they % make 96 channels at default fs = 22050, 114 channels at 44100. if nargin < 6 % HACK: these constant control the defaults one_cap = 0; % bool; 0 for new two-cap hack just_hwr = 0; % book; 0 for normal/fancy IHC; 1 for HWR if just_hwr CF_IHC_params = struct('just_hwr', 1); % just a simple HWR else if one_cap CF_IHC_params = struct( ... 'just_hwr', 0, ... % not just a simple HWR 'one_cap', one_cap, ... % bool; 0 for new two-cap hack 'tau_lpf', 0.000080, ... % 80 microseconds smoothing twice 'tau_out', 0.0005, ... % depletion tau is pretty fast 'tau_in', 0.010 ); % recovery tau is slower else CF_IHC_params = struct( ... 'just_hwr', 0, ... % not just a simple HWR 'one_cap', one_cap, ... % bool; 0 for new two-cap hack 'tau_lpf', 0.000080, ... % 80 microseconds smoothing twice 'tau1_out', 0.020, ... % depletion tau is pretty fast 'tau1_in', 0.020, ... % recovery tau is slower 'tau2_out', 0.005, ... % depletion tau is pretty fast 'tau2_in', 0.005 ); % recovery tau is slower end end end if nargin < 5 % Ref: Glasberg and Moore: Hearing Research, 47 (1990), 103-138 % ERB = 24.7 * (1 + 4.37 * CF_Hz / 1000); ERB_Q = 1000/(24.7*4.37); % 9.2645 if nargin < 4 ERB_break_freq = 1000/4.37; % 228.833 end end if nargin < 3 CF_AGC_params = struct( ... 'n_stages', 4, ... 'time_constants', [1, 4, 16, 64]*0.002, ... 'AGC_stage_gain', 2, ... % gain from each stage to next slower stage 'decimation', 16, ... % how often to update the AGC states 'AGC1_scales', [1, 2, 3, 4]*1, ... % in units of channels 'AGC2_scales', [1, 2, 3, 4]*1.25, ... % spread more toward base 'detect_scale', 0.15, ... % the desired damping range 'AGC_mix_coeff', 0.25); end if nargin < 2 CF_filter_params = struct( ... 'velocity_scale', 0.2, ... % for the cubic nonlinearity 'min_zeta', 0.12, ... 'first_pole_theta', 0.78*pi, ... 'zero_ratio', sqrt(2), ... 'ERB_per_step', 0.3333, ... % assume G&M's ERB formula 'min_pole_Hz', 40 ); end if nargin < 1 fs = 22050; end % first figure out how many filter stages (PZFC/CARFAC channels): pole_Hz = CF_filter_params.first_pole_theta * fs / (2*pi); n_ch = 0; while pole_Hz > CF_filter_params.min_pole_Hz n_ch = n_ch + 1; pole_Hz = pole_Hz - CF_filter_params.ERB_per_step * ... ERB_Hz(pole_Hz, ERB_break_freq, ERB_Q); end % Now we have n_ch, the number of channels, so can make the array % and compute all the frequencies again to put into it: pole_freqs = zeros(n_ch, 1); pole_Hz = CF_filter_params.first_pole_theta * fs / (2*pi); for ch = 1:n_ch pole_freqs(ch) = pole_Hz; pole_Hz = pole_Hz - CF_filter_params.ERB_per_step * ... ERB_Hz(pole_Hz, ERB_break_freq, ERB_Q); end % now we have n_ch, the number of channels, and pole_freqs array CF = struct( ... 'fs', fs, ... 'filter_params', CF_filter_params, ... 'AGC_params', CF_AGC_params, ... 'IHC_params', CF_IHC_params, ... 'n_ch', n_ch, ... 'pole_freqs', pole_freqs, ... 'filter_coeffs', CARFAC_DesignFilters(CF_filter_params, fs, pole_freqs), ... 'AGC_coeffs', CARFAC_DesignAGC(CF_AGC_params, fs), ... 'IHC_coeffs', CARFAC_DesignIHC(CF_IHC_params, fs), ... 'n_mics', 0 ); % adjust the AGC_coeffs to account for IHC saturation level to get right % damping change as specified in CF.AGC_params.detect_scale CF.AGC_coeffs.detect_scale = CF.AGC_params.detect_scale / ... (CF.IHC_coeffs.saturation_output * CF.AGC_coeffs.AGC_gain); %% Design the filter coeffs: function filter_coeffs = CARFAC_DesignFilters(filter_params, fs, pole_freqs) n_ch = length(pole_freqs); % the filter design coeffs: filter_coeffs = struct('velocity_scale', filter_params.velocity_scale); filter_coeffs.r_coeffs = zeros(n_ch, 1); filter_coeffs.a_coeffs = zeros(n_ch, 1); filter_coeffs.c_coeffs = zeros(n_ch, 1); filter_coeffs.h_coeffs = zeros(n_ch, 1); filter_coeffs.g_coeffs = zeros(n_ch, 1); % zero_ratio comes in via h. In book's circuit D, zero_ratio is 1/sqrt(a), % and that a is here 1 / (1+f) where h = f*c. % solve for f: 1/zero_ratio^2 = 1 / (1+f) % zero_ratio^2 = 1+f => f = zero_ratio^2 - 1 f = filter_params.zero_ratio^2 - 1; % nominally 1 for half-octave % Make pole positions, s and c coeffs, h and g coeffs, etc., % which mostly depend on the pole angle theta: theta = pole_freqs .* (2 * pi / fs); % different possible interpretations for min-damping r: % r = exp(-theta * CF_filter_params.min_zeta). % Using sin gives somewhat higher Q at highest thetas. r = (1 - sin(theta) * filter_params.min_zeta); filter_coeffs.r_coeffs = r; % undamped coupled-form coefficients: filter_coeffs.a_coeffs = cos(theta); filter_coeffs.c_coeffs = sin(theta); % the zeros follow via the h_coeffs h = sin(theta) .* f; filter_coeffs.h_coeffs = h; r2 = r; % aim for unity DC gain at min damping, here; or could try r^2 filter_coeffs.g_coeffs = 1 ./ (1 + h .* r2 .* sin(theta) ./ ... (1 - 2 * r2 .* cos(theta) + r2 .^ 2)); %% the AGC design coeffs: function AGC_coeffs = CARFAC_DesignAGC(AGC_params, fs) AGC_coeffs = struct('AGC_stage_gain', AGC_params.AGC_stage_gain, ... 'AGC_mix_coeff', AGC_params.AGC_mix_coeff); % AGC1 pass is smoothing from base toward apex; % AGC2 pass is back, which is done first now AGC1_scales = AGC_params.AGC1_scales; AGC2_scales = AGC_params.AGC2_scales; n_AGC_stages = AGC_params.n_stages; AGC_coeffs.AGC_epsilon = zeros(1, n_AGC_stages); % the 1/(tau*fs) roughly decim = AGC_params.decimation; gain = 0; for stage = 1:n_AGC_stages tau = AGC_params.time_constants(stage); % epsilon is how much new input to take at each update step: AGC_coeffs.AGC_epsilon(stage) = 1 - exp(-decim / (tau * fs)); % and these are the smoothing scales and poles for decimated rate: ntimes = tau * (fs / decim); % effective number of smoothings % divide the spatial variance by effective number of smoothings: t = (AGC1_scales(stage)^2) / ntimes; % adjust scale for diffusion AGC_coeffs.AGC1_polez(stage) = 1 + 1/t - sqrt((1+1/t)^2 - 1); t = (AGC2_scales(stage)^2) / ntimes; % adjust scale for diffusion AGC_coeffs.AGC2_polez(stage) = 1 + 1/t - sqrt((1+1/t)^2 - 1); gain = gain + AGC_params.AGC_stage_gain^(stage-1); end AGC_coeffs.AGC_gain = gain; %% the IHC design coeffs: function IHC_coeffs = CARFAC_DesignIHC(IHC_params, fs) if IHC_params.just_hwr IHC_coeffs = struct('just_hwr', 1); IHC_coeffs.saturation_output = 10; % HACK: assume some max out else if IHC_params.one_cap IHC_coeffs = struct(... 'just_hwr', 0, ... 'lpf_coeff', 1 - exp(-1/(IHC_params.tau_lpf * fs)), ... 'out_rate', 1 / (IHC_params.tau_out * fs), ... 'in_rate', 1 / (IHC_params.tau_in * fs), ... 'one_cap', IHC_params.one_cap); else IHC_coeffs = struct(... 'just_hwr', 0, ... 'lpf_coeff', 1 - exp(-1/(IHC_params.tau_lpf * fs)), ... 'out1_rate', 1 / (IHC_params.tau1_out * fs), ... 'in1_rate', 1 / (IHC_params.tau1_in * fs), ... 'out2_rate', 1 / (IHC_params.tau2_out * fs), ... 'in2_rate', 1 / (IHC_params.tau2_in * fs), ... 'one_cap', IHC_params.one_cap); end % run one channel to convergence to get rest state: IHC_coeffs.rest_output = 0; IHC_state = struct( ... 'cap_voltage', 0, ... 'cap1_voltage', 0, ... 'cap2_voltage', 0, ... 'lpf1_state', 0, ... 'lpf2_state', 0, ... 'ihc_accum', 0); IHC_in = 0; for k = 1:30000 [IHC_out, IHC_state] = CARFAC_IHCStep(IHC_in, IHC_coeffs, IHC_state); end IHC_coeffs.rest_output = IHC_out; IHC_coeffs.rest_cap = IHC_state.cap_voltage; IHC_coeffs.rest_cap1 = IHC_state.cap1_voltage; IHC_coeffs.rest_cap2 = IHC_state.cap2_voltage; LARGE = 2; IHC_in = LARGE; % "Large" saturating input to IHC; make it alternate for k = 1:30000 [IHC_out, IHC_state] = CARFAC_IHCStep(IHC_in, IHC_coeffs, IHC_state); prev_IHC_out = IHC_out; IHC_in = -IHC_in; end IHC_coeffs.saturation_output = (IHC_out + prev_IHC_out) / 2; end %% % default design result, running this function with no args, should look % like this, before CARFAC_Init puts state storage into it: % % CF = CARFAC_Design % CF.filter_params % CF.AGC_params % CF.filter_coeffs % CF.AGC_coeffs % CF.IHC_coeffs % % CF = % fs: 22050 % filter_params: [1x1 struct] % AGC_params: [1x1 struct] % IHC_params: [1x1 struct] % n_ch: 96 % pole_freqs: [96x1 double] % filter_coeffs: [1x1 struct] % AGC_coeffs: [1x1 struct] % IHC_coeffs: [1x1 struct] % n_mics: 0 % ans = % velocity_scale: 0.2000 % min_zeta: 0.1200 % first_pole_theta: 2.4504 % zero_ratio: 1.4142 % ERB_per_step: 0.3333 % min_pole_Hz: 40 % ans = % n_stages: 4 % time_constants: [0.0020 0.0080 0.0320 0.1280] % AGC_stage_gain: 2 % decimation: 16 % AGC1_scales: [1 2 3 4] % AGC2_scales: [1.2500 2.5000 3.7500 5] % detect_scale: 0.1500 % AGC_mix_coeff: 0.2500 % ans = % velocity_scale: 0.2000 % r_coeffs: [96x1 double] % a_coeffs: [96x1 double] % c_coeffs: [96x1 double] % h_coeffs: [96x1 double] % g_coeffs: [96x1 double] % ans = % AGC_stage_gain: 2 % AGC_mix_coeff: 0.2500 % AGC_epsilon: [0.3043 0.0867 0.0224 0.0057] % AGC1_polez: [0.1356 0.1356 0.0854 0.0417] % AGC2_polez: [0.1872 0.1872 0.1227 0.0623] % AGC_gain: 15 % detect_scale: 0.0630 % ans = % lpf_coeff: 0.4327 % out1_rate: 0.0023 % in1_rate: 0.0023 % out2_rate: 0.0091 % in2_rate: 0.0091 % one_cap: 0 % rest_output: 0.0365 % rest_cap: 0 % rest_cap1: 0.9635 % rest_cap2: 0.9269 % saturation_output: 0.1587