Shift Filter outputs to align peaks

16 ビュー (過去 30 日間)
S
S 2024 年 3 月 24 日
コメント済み: S 2024 年 4 月 6 日
I am trying to add a time delay to each of my filters so that they are all overlayed on top of each other. They aren't all being shifted by the exact same amount as I want the center point (peak) of them all to align. I am unsure how I would either calculate this value or if there is a function which does this for you. I have found fftshift but no other shifting function. I am referring to figure 4! Thank you for your time!
clc
clearvars
close all
fs = 20e3;
numFilts = 32; %
filter_number = numFilts;
order = 4;
CenterFreqs = logspace(log10(50), log10(8000), numFilts);
figure
plot(CenterFreqs)
title('Center Frequencies')
% input signal definition
signal_freq = 100; % Hz
Nperiods = 10; % we need more than 1 period of signal to reach the steady state output (look a the IR samples)
t = linspace(0,Nperiods/signal_freq,200*Nperiods); %
end
title('Impulse Response');
hold off
xlim([0 500]);
for ii = 1:numel(indf)
output(ii,:) = filter(IR_array{indf(ii)},1,input);
plot(t,output(ii,:))
LEGs{ii} = ['Filter # ' num2str(indf(ii))]; %assign legend name to each
end
output_sum = sum(output,1);
plot(t,output_sum)
LEGs{ii+1} = ['Sum'];
legend(LEGs{:})
legend('Show')
title('Filter output signals');
xlabel('Time (s)');
ylabel('Amplitude');
hold off
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
function IR = gammatone(order, centerFrequency, fs)
% Design a gammatone filter
earQ = 9.26449;
minBW = 24.7;
% erb = (centerFrequency / earQ) + minBW;
erb = ((centerFrequency/earQ)^order + (minBW)^order)^(1/order);% we use the generalized
  2 件のコメント
S
S 2024 年 3 月 24 日
@Mathieu NOE Tagging you in case!:)
Mathieu NOE
Mathieu NOE 2024 年 3 月 25 日
hello again @S
I am unsure why we have to do this - see my comment to the answer provided below
Tx

サインインしてコメントする。

採用された回答

Mathieu NOE
Mathieu NOE 2024 年 3 月 26 日
移動済み: Mathieu NOE 2024 年 3 月 29 日
hello @Chunru
sorry but I was a bit skeptical about your solution based on group delay
seems to me the "aligned" output signals are not that aligned ...
first I thought that maybe the group delay should be computed at the signal frequency (100 Hz) and not at the CF , but even with that mod I coudn't get the desired aligned plot
then also the sign of the time shift is incorrect as we need to add the delay to t and not retrieve it (the output of the grpdelay function is a positive number of samples, corresponding to a negative phase shift)
finally , I simply used the filter's phase value , interpolated at the signal frequency and I think now we can say the output signals are perfectly aligned
I simply removed the output sum from this time plot as I think it doesn't make sense here
fs = 20e3;
numFilts = 32; %
filter_number = numFilts;
order = 4;
CenterFreqs = logspace(log10(50), log10(8000), numFilts);
figure
plot(CenterFreqs)
title('Center Frequencies')
% input signal definition
signal_freq = 100; % Hz
Nperiods = 10; % we need more than 1 period of signal to reach the steady state output (look a the IR samples)
t = linspace(0,Nperiods/signal_freq,200*Nperiods); %
input = sin(2*pi*signal_freq*t) + 0.25*rand(size(t));
figure
hold on
for ii = 1:filter_number
IR = gammatone(order, CenterFreqs(ii), fs);
[tmp,~] = freqz(IR,1,1024*2,fs);
% scale the IR amplitude so that the max modulus is 0 dB
a = 1/max(abs(tmp));
% % or if you prefer - 3dB
% g = 10^(-3 / 20); % 3 dB down from peak
% a = g/max(abs(tmp));
IR_array{ii} = IR*a; % scale IR and store in cell array afterwards
[h{ii},f] = freqz(IR_array{ii},1,1024*2,fs); % now store h{ii} after amplitude correction
plot(IR_array{ii})
end
title('Impulse Response');
hold off
xlim([0 500]);
figure
hold on
for ii = 1:filter_number
plot(f,20*log10(abs(h{ii})))
end
title('Bode plot');
set(gca,'XScale','log');
xlabel('Freq(Hz)');
ylabel('Gain (dB)');
ylim([-100 6]);
figure
hold on
indf = find(CenterFreqs<signal_freq); % define up to which filter we need to work
for ii = 1:numel(indf)
output(ii,:) = filter(IR_array{indf(ii)},1,input);
%plot(t ,output(ii,:))
phase_cor(ii) = interp1(f,angle(h{ii}),signal_freq);
t_shift(ii) = phase_cor(ii)/(2*pi*signal_freq); % align
plot(t + t_shift(ii),output(ii,:)) % align
LEGs{ii} = ['Filter # ' num2str(indf(ii))]; %assign legend name to each
end
output_sum = sum(output,1);
% plot(t,output_sum)
% LEGs{ii+1} = ['Sum'];
legend(LEGs{:})
legend('Show')
title('Filter output signals');
xlabel('Time (s)');
ylabel('Amplitude');
hold off
%% perform FFT of signal :
[freq,fft_spectrum] = do_fft(t,output_sum);
figure
plot(freq,fft_spectrum,'-*')
xlim([0 1000]);
title('FFT of output sum signal')
ylabel('Amplitude');
xlabel('Frequency [Hz]')
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
function [freq_vector,fft_spectrum] = do_fft(time,data)
time = time(:);
data = data(:);
dt = mean(diff(time));
Fs = 1/dt;
nfft = length(data); % maximise freq resolution => nfft equals signal length
%% use windowing or not at your conveniance
% no window
fft_spectrum = abs(fft(data))*2/nfft;
% % hanning window
% window = hanning(nfft);
% window = window(:);
% fft_spectrum = abs(fft(data.*window))*4/nfft;
% one sidded fft spectrum % Select first half
if rem(nfft,2) % nfft odd
select = (1:(nfft+1)/2)';
else
select = (1:nfft/2+1)';
end
fft_spectrum = fft_spectrum(select,:);
freq_vector = (select - 1)*Fs/nfft;
end
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
function IR = gammatone(order, centerFrequency, fs)
% Design a gammatone filter
earQ = 9.26449;
minBW = 24.7;
% erb = (centerFrequency / earQ) + minBW;
erb = ((centerFrequency/earQ)^order + (minBW)^order)^(1/order);% we use the generalized
% function (depending on order)
% B = 1.019 .* 2 .* pi .* erb; % no, the 2*pi factor is implemented twice in your code
B = 1.019 * erb;
% g = 10^(-3 / 20); % 3 dB down from peak % what is it for ? see main code above
f = centerFrequency;
tau = 1. / (2. .* pi .* B);
% gammatone filter IR
% t = (0:1/fs:10/f);
tmax = tau + 20/(2*pi*B);
t = (0:1/fs:tmax);
temp = (t - tau) > 0;
% IR = (t.^(order - 1)) .* exp(-2 .* pi .* B .* (t - tau)) .* g .* cos(2*pi*f*(t - tau)) .* temp;
IR = ((t - tau).^(order - 1)) .* exp(-2*pi*B*(t - tau)).* cos(2*pi*f*(t - tau)) .* temp;
end

その他の回答 (1 件)

Chunru
Chunru 2024 年 3 月 25 日
You can compute the group delay around the fc to align the output (approximately).
fs = 20e3;
numFilts = 32; %
filter_number = numFilts;
order = 4;
CenterFreqs = logspace(log10(50), log10(8000), numFilts);
figure
plot(CenterFreqs)
title('Center Frequencies')
% input signal definition
signal_freq = 100; % Hz
Nperiods = 10; % we need more than 1 period of signal to reach the steady state output (look a the IR samples)
t = linspace(0,Nperiods/signal_freq,200*Nperiods); %
input = sin(2*pi*signal_freq*t) + 0*rand(size(t));
figure
hold on
for ii = 1:filter_number
IR = gammatone(order, CenterFreqs(ii), fs);
% Get the group delay around center freq
[gd,f] = grpdelay(IR, 1, 1024, fs);
[~, ind] = min(abs(f-CenterFreqs(ii)));
GroupDelay(ii) = gd(ind); % in samples
[tmp,~] = freqz(IR,1,1024*2,fs);
% scale the IR amplitude so that the max modulus is 0 dB
a = 1/max(abs(tmp));
% % or if you prefer - 3dB
% g = 10^(-3 / 20); % 3 dB down from peak
% a = g/max(abs(tmp));
IR_array{ii} = IR*a; % scale IR and store in cell array afterwards
[h{ii},f] = freqz(IR_array{ii},1,1024*2,fs); % now store h{ii} after amplitude correction
plot(IR_array{ii})
end
GroupDelay
GroupDelay = 1x32
1.0e+03 * 0.2382 0.2069 0.1890 0.1776 0.1402 0.1360 -0.9253 1.0474 1.0613 0.5075 0.4554 0.3999 0.3458 0.2968 0.2534 0.2158 0.1833 0.1558 0.1325 0.1124 0.0954 0.0809 0.0689 0.0583 0.0495 0.0419 0.0356 0.0305 0.0255 0.0217
title('Impulse Response');
hold off
xlim([0 500]);
figure
hold on
for ii = 1:filter_number
plot(f,20*log10(abs(h{ii})))
end
title('Bode plot');
set(gca,'XScale','log');
xlabel('Freq(Hz)');
ylabel('Gain (dB)');
ylim([-100 6]);
figure
hold on
indf = find(CenterFreqs<signal_freq); % define up to which filter we need to work
for ii = 1:numel(indf)
output(ii,:) = filter(IR_array{indf(ii)},1,input);
plot(t ,output(ii,:))
%plot(t - GroupDelay(ii)/fs,output(ii,:)) % align
LEGs{ii} = ['Filter # ' num2str(indf(ii))]; %assign legend name to each
end
output_sum = sum(output,1);
plot(t,output_sum)
LEGs{ii+1} = ['Sum'];
legend(LEGs{:})
legend('Show')
title('Filter output signals');
xlabel('Time (s)');
ylabel('Amplitude');
hold off
figure
hold on
indf = find(CenterFreqs<signal_freq); % define up to which filter we need to work
for ii = 1:numel(indf)
output(ii,:) = filter(IR_array{indf(ii)},1,input);
%plot(t ,output(ii,:))
plot(t - GroupDelay(ii)/fs,output(ii,:)) % align
LEGs{ii} = ['Filter # ' num2str(indf(ii))]; %assign legend name to each
end
output_sum = sum(output,1);
plot(t,output_sum)
LEGs{ii+1} = ['Sum'];
legend(LEGs{:})
legend('Show')
title('Filter output signals (Aligned)');
xlabel('Time (s)');
ylabel('Amplitude');
hold off
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
function IR = gammatone(order, centerFrequency, fs)
% Design a gammatone filter
earQ = 9.26449;
minBW = 24.7;
% erb = (centerFrequency / earQ) + minBW;
erb = ((centerFrequency/earQ)^order + (minBW)^order)^(1/order);% we use the generalized
% function (depending on order)
% B = 1.019 .* 2 .* pi .* erb; % no, the 3pi factor is implemented twice in your code
B = 1.019 * erb;
% g = 10^(-3 / 20); % 3 dB down from peak % what is it for ? see main code above
f = centerFrequency;
tau = 1. / (2. .* pi .* B);
% gammatone filter IR
t = (0:1/fs:10/f);
temp = (t - tau) > 0;
% IR = (t.^(order - 1)) .* exp(-2 .* pi .* B .* (t - tau)) .* g .* cos(2*pi*f*(t - tau)) .* temp;
IR = ((t - tau).^(order - 1)) .* exp(-2*pi*B*(t - tau)).* cos(2*pi*f*(t - tau)) .* temp;
end
  13 件のコメント
Mathieu NOE
Mathieu NOE 2024 年 4 月 5 日
yes, the fft frequency resolution get's better as your record length increases
df = nfft / Fs , so for a given sampling rate Fs, if you make a single fft computation (and not an averaged fft) , so nfft = nb of samples of your signal; a longer signal means a larger nfft value, so you see that df (your fft frequency resolution ) will be reduced (a better resolution)
you can see by yourself by choising Nperiods = 10, then 20, .. or higher values
S
S 2024 年 4 月 6 日
That makes sense! Thank you! @Mathieu NOE

サインインしてコメントする。

カテゴリ

Help Center および File ExchangeSpectral Estimation についてさらに検索

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by