Thomas Dehaeze
6e3677eb29
Folder name is changed, rework the html templates Change the organisation.
580 lines
19 KiB
Org Mode
580 lines
19 KiB
Org Mode
#+TITLE:Huddle Test of the L22 Geophones
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#+SETUPFILE: ../config.org
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* Experimental Setup
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Two L22 geophones are used.
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They are placed on the ID31 granite.
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They are leveled.
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The signals are amplified using voltage amplifier with a gain of 60dB.
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The voltage amplifiers includes:
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- an high pass filter with a cut-off frequency at 1.5Hz (AC option)
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- a low pass filter with a cut-off frequency at 1kHz
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#+name: fig:figure_name
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#+caption: Setup
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#+attr_html: :width 500px
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[[file:./img/setup.jpg]]
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#+name: fig:figure_name
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#+caption: Geophones
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#+attr_html: :width 500px
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[[file:./img/geophones.jpg]]
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* Signal Processing
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:PROPERTIES:
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:header-args:matlab+: :tangle matlab/huddle_test_signal_processing.m
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:header-args:matlab+: :comments org :mkdirp yes
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:END:
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<<sec:huddle_test_signal_processing>>
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#+begin_src bash :exports none :results none
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if [ matlab/huddle_test_signal_processing.m -nt data/huddle_test_signal_processing.zip ]; then
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cp matlab/huddle_test_signal_processing.m huddle_test_signal_processing.m;
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zip data/huddle_test_signal_processing \
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mat/data_001.mat \
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huddle_test_signal_processing.m;
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rm huddle_test_signal_processing.m;
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fi
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#+end_src
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#+begin_note
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All the files (data and Matlab scripts) are accessible [[file:data/huddle_test_signal_processing.zip][here]].
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#+end_note
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** Matlab Init :noexport:ignore:
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#+begin_src matlab :tangle no :exports none :results silent :noweb yes :var current_dir=(file-name-directory buffer-file-name)
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<<matlab-dir>>
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#+end_src
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#+begin_src matlab :exports none :results silent :noweb yes
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<<matlab-init>>
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#+end_src
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** Load data
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We load the data of the z axis of two geophones.
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#+begin_src matlab :results none
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load('mat/data_001.mat', 't', 'x1', 'x2');
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dt = t(2) - t(1);
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#+end_src
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** Time Domain Data
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(t, x1);
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plot(t, x2);
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hold off;
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xlabel('Time [s]');
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ylabel('Voltage [V]');
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xlim([t(1), t(end)]);
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#+end_src
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#+NAME: fig:data_time_domain
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/data_time_domain.pdf" :var figsize="wide-normal" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:data_time_domain
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#+CAPTION: Time domain Data
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#+RESULTS: fig:data_time_domain
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[[file:figs/data_time_domain.png]]
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(t, x1);
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plot(t, x2);
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hold off;
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xlabel('Time [s]');
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ylabel('Voltage [V]');
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xlim([0 1]);
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#+end_src
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#+NAME: fig:data_time_domain_zoom
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/data_time_domain_zoom.pdf" :var figsize="wide-normal" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:data_time_domain_zoom
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#+CAPTION: Time domain Data - Zoom
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#+RESULTS: fig:data_time_domain_zoom
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[[file:figs/data_time_domain_zoom.png]]
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** Computation of the ASD of the measured voltage
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We first define the parameters for the frequency domain analysis.
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#+begin_src matlab :results none
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Fs = 1/dt; % [Hz]
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win = hanning(ceil(10*Fs));
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#+end_src
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Then we compute the Power Spectral Density using =pwelch= function.
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#+begin_src matlab :results none
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[pxx1, f] = pwelch(x1, win, [], [], Fs);
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[pxx2, ~] = pwelch(x2, win, [], [], Fs);
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#+end_src
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And we plot the result on figure [[fig:asd_voltage]].
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(f, sqrt(pxx1));
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plot(f, sqrt(pxx2));
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hold off;
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set(gca, 'xscale', 'log');
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set(gca, 'yscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('ASD of the measured Voltage $\left[\frac{V}{\sqrt{Hz}}\right]$')
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:asd_voltage
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/asd_voltage.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:asd_voltage
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#+CAPTION: Amplitude Spectral Density of the measured voltage
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#+RESULTS: fig:asd_voltage
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[[file:figs/asd_voltage.png]]
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** Scaling to take into account the sensibility of the geophone and the voltage amplifier
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The Geophone used are L22. Their sensibility is shown on figure [[fig:geophone_sensibility]].
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#+begin_src matlab :results none
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S0 = 88; % Sensitivity [V/(m/s)]
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f0 = 2; % Cut-off frequnecy [Hz]
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S = S0*(s/2/pi/f0)/(1+s/2/pi/f0);
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#+end_src
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#+begin_src matlab :results none :exports none
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figure;
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bodeFig({S}, logspace(-1, 2, 1000));
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ylabel('Amplitude $\left[\frac{V}{m/s}\right]$')
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#+end_src
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#+NAME: fig:geophone_sensibility
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/geophone_sensibility.pdf" :var figsize="wide-normal" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:geophone_sensibility
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#+CAPTION: Sensibility of the Geophone
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#+RESULTS: fig:geophone_sensibility
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[[file:figs/geophone_sensibility.png]]
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We also take into account the gain of the electronics which is here set to be $60dB$.
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#+begin_src matlab :results none
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G0_db = 60; % [dB]
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G0 = 10^(60/G0_db); % [abs]
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#+end_src
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We divide the ASD measured (in $\text{V}/\sqrt{\text{Hz}}$) by the gain of the voltage amplifier to obtain the ASD of the voltage across the geophone.
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We further divide the result by the sensibility of the Geophone to obtain the ASD of the velocity in $m/s/\sqrt{Hz}$.
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#+begin_src matlab :results none
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scaling = 1./squeeze(abs(freqresp(G0*S, f, 'Hz')));
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#+end_src
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** Computation of the ASD of the velocity
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The ASD of the measured velocity is shown on figure [[fig:psd_velocity]].
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(f, sqrt(pxx1).*scaling);
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plot(f, sqrt(pxx2).*scaling);
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hold off;
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set(gca, 'xscale', 'log');
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set(gca, 'yscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('ASD of the measured Velocity $\left[\frac{m/s}{\sqrt{Hz}}\right]$')
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:psd_velocity
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/psd_velocity.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:psd_velocity
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#+CAPTION: Amplitude Spectral Density of the Velocity
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#+RESULTS: fig:psd_velocity
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[[file:figs/psd_velocity.png]]
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We also plot the ASD in displacement (figure [[fig:asd_displacement]]);
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(f, (sqrt(pxx1).*scaling)./(2*pi*f));
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plot(f, (sqrt(pxx2).*scaling)./(2*pi*f));
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hold off;
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set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('ASD of the displacement $\left[\frac{m}{\sqrt{Hz}}\right]$')
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:asd_displacement
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/asd_displacement.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:asd_displacement
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#+CAPTION: Amplitude Spectral Density of the Displacement
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#+RESULTS: fig:asd_displacement
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[[file:figs/asd_displacement.png]]
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** Transfer function between the two geophones
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We here compute the transfer function from one geophone to the other.
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The result is shown on figure [[fig:tf_geophones]].
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We also compute the coherence between the two signals (figure [[fig:coh_geophones]]).
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#+begin_src matlab :results none
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[T12, ~] = tfestimate(x1, x2, win, [], [], Fs);
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#+end_src
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#+begin_src matlab :results none :exports none
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figure;
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ax1 = subplot(2, 1, 1);
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plot(f, abs(T12));
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set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
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set(gca, 'XTickLabel',[]);
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ylabel('Magnitude');
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ax2 = subplot(2, 1, 2);
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plot(f, mod(180+180/pi*phase(T12), 360)-180);
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set(gca, 'xscale', 'log');
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ylim([-180, 180]);
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yticks([-180, -90, 0, 90, 180]);
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xlabel('Frequency [Hz]'); ylabel('Phase [deg]');
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linkaxes([ax1,ax2],'x');
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:tf_geophones
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/tf_geophones.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:tf_geophones
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#+CAPTION: Estimated transfer function between the two geophones
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#+RESULTS: fig:tf_geophones
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[[file:figs/tf_geophones.png]]
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#+begin_src matlab :results none
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[coh12, ~] = mscohere(x1, x2, win, [], [], Fs);
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#+end_src
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#+begin_src matlab :results none :exports none
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figure;
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plot(f, coh12);
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set(gca, 'xscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('Coherence');
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ylim([0,1]); xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:coh_geophones
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/coh_geophones.pdf" :var figsize="wide-normal" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:coh_geophones
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#+CAPTION: Cohererence between the signals of the two geophones
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#+RESULTS: fig:coh_geophones
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[[file:figs/coh_geophones.png]]
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** Estimation of the sensor noise
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The technique to estimate the sensor noise is taken from cite:barzilai98_techn_measur_noise_sensor_presen.
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The coherence between signals $X$ and $Y$ is defined as follow
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\[ \gamma^2_{XY}(\omega) = \frac{|G_{XY}(\omega)|^2}{|G_{X}(\omega)| |G_{Y}(\omega)|} \]
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where $|G_X(\omega)|$ is the output Power Spectral Density (PSD) of signal $X$ and $|G_{XY}(\omega)|$ is the Cross Spectral Density (CSD) of signal $X$ and $Y$.
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The PSD and CSD are defined as follow:
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\begin{align}
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|G_X(\omega)| &= \frac{2}{n_d T} \sum^{n_d}_{n=1} \left| X_k(\omega, T) \right|^2 \\
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|G_{XY}(\omega)| &= \frac{2}{n_d T} \sum^{n_d}_{n=1} [ X_k^*(\omega, T) ] [ Y_k(\omega, T) ]
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\end{align}
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where:
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- $n_d$ is the number for records averaged
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- $T$ is the length of each record
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- $X_k(\omega, T)$ is the finite Fourier transform of the kth record
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- $X_k^*(\omega, T)$ is its complex conjugate
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The =mscohere= function is compared with this formula on Appendix (section [[sec:coherence]]), it is shown that it is identical.
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Figure [[fig:huddle_test]] illustrate a block diagram model of the system used to determine the sensor noise of the geophone.
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Two geophones are mounted side by side to ensure that they are exposed by the same motion input $U$.
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Each sensor has noise $N$ and $M$.
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#+NAME: fig:huddle_test
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#+CAPTION: Huddle test block diagram
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[[file:figs/huddle-test.png]]
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We here assume that each sensor has the same magnitude of instrumental noise ($N = M$).
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We also assume that $S_1 = S_2 = 1$.
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We then obtain:
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#+NAME: eq:coh_bis
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\begin{equation}
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\gamma_{XY}^2(\omega) = \frac{1}{1 + 2 \left( \frac{|G_N(\omega)|}{|G_U(\omega)|} \right) + \left( \frac{|G_N(\omega)|}{|G_U(\omega)|} \right)^2}
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\end{equation}
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Since the input signal $U$ and the instrumental noise $N$ are incoherent:
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#+NAME: eq:incoherent_noise
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\begin{equation}
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|G_X(\omega)| = |G_N(\omega)| + |G_U(\omega)|
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\end{equation}
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From equations [[eq:coh_bis]] and [[eq:incoherent_noise]], we finally obtain
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#+begin_important
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#+NAME: eq:noise_psd
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\begin{equation}
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|G_N(\omega)| = |G_X(\omega)| \left( 1 - \sqrt{\gamma_{XY}^2(\omega)} \right)
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\end{equation}
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#+end_important
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The instrumental noise is computed below. The result in V^2/Hz is shown on figure [[fig:intrumental_noise_V]].
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#+begin_src matlab :results none
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pxxN = pxx1.*(1 - coh12);
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#+end_src
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(f, pxx1, '-');
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plot(f, pxx2, '-');
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plot(f, pxxN, 'k--');
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hold off;
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set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('PSD of the measured Voltage $\left[\frac{V^2}{Hz}\right]$');
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:intrumental_noise_V
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/intrumental_noise_V.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:intrumental_noise_V
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#+CAPTION: Instrumental Noise and Measurement in $V^2/Hz$
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#+RESULTS: fig:intrumental_noise_V
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[[file:figs/intrumental_noise_V.png]]
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This is then further converted into velocity and compared with the ground velocity measurement. (figure [[fig:intrumental_noise_velocity]])
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#+begin_src matlab :results none
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figure;
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hold on;
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plot(f, sqrt(pxx1).*scaling, '-');
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plot(f, sqrt(pxx2).*scaling, '-');
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plot(f, sqrt(pxxN).*scaling, 'k--');
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hold off;
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set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
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xlabel('Frequency [Hz]'); ylabel('ASD of the Velocity $\left[\frac{m/s}{\sqrt{Hz}}\right]$');
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xlim([0.1, 500]);
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#+end_src
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#+NAME: fig:intrumental_noise_velocity
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#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
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#+begin_src matlab :var filepath="figs/intrumental_noise_velocity.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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<<plt-matlab>>
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#+end_src
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#+NAME: fig:intrumental_noise_velocity
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#+CAPTION: Instrumental Noise and Measurement in $m/s/\sqrt{Hz}$
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#+RESULTS: fig:intrumental_noise_velocity
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[[file:figs/intrumental_noise_velocity.png]]
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* Compare axis
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:PROPERTIES:
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:header-args:matlab+: :tangle matlab/huddle_test_compare_axis.m
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:header-args:matlab+: :comments org :mkdirp yes
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:END:
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<<sec:huddle_test_compare_axis>>
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#+begin_src bash :exports none :results none
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if [ matlab/huddle_test_compare_axis.m -nt data/huddle_test_compare_axis.zip ]; then
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cp matlab/huddle_test_compare_axis.m huddle_test_compare_axis.m;
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zip data/huddle_test_compare_axis \
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mat/data_001.mat \
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mat/data_002.mat \
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mat/data_003.mat \
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huddle_test_compare_axis.m;
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rm huddle_test_compare_axis.m;
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fi
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#+end_src
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#+begin_note
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All the files (data and Matlab scripts) are accessible [[file:data/huddle_test_compare_axis.zip][here]].
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#+end_note
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** Matlab Init :noexport:ignore:
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#+begin_src matlab :tangle no :exports none :results silent :noweb yes :var current_dir=(file-name-directory buffer-file-name)
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<<matlab-dir>>
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#+end_src
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#+begin_src matlab :exports none :results silent :noweb yes
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<<matlab-init>>
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#+end_src
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|
** Load data
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|
We first load the data for the three axis.
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#+begin_src matlab :results none
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|
z = load('mat/data_001.mat', 't', 'x1', 'x2');
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east = load('mat/data_002.mat', 't', 'x1', 'x2');
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north = load('mat/data_003.mat', 't', 'x1', 'x2');
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#+end_src
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|
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** Compare PSD
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The PSD for each axis of the two geophones are computed.
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|
#+begin_src matlab :results none
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|
[pz1, fz] = pwelch(z.x1, hanning(ceil(length(z.x1)/100)), [], [], 1/(z.t(2)-z.t(1)));
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[pz2, ~] = pwelch(z.x2, hanning(ceil(length(z.x2)/100)), [], [], 1/(z.t(2)-z.t(1)));
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[pe1, fe] = pwelch(east.x1, hanning(ceil(length(east.x1)/100)), [], [], 1/(east.t(2)-east.t(1)));
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[pe2, ~] = pwelch(east.x2, hanning(ceil(length(east.x2)/100)), [], [], 1/(east.t(2)-east.t(1)));
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[pn1, fn] = pwelch(north.x1, hanning(ceil(length(north.x1)/100)), [], [], 1/(north.t(2)-north.t(1)));
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[pn2, ~] = pwelch(north.x2, hanning(ceil(length(north.x2)/100)), [], [], 1/(north.t(2)-north.t(1)));
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#+end_src
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|
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We compare them. The result is shown on figure [[fig:compare_axis_psd]].
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#+begin_src matlab :results none :exports none
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|
figure;
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|
hold on;
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|
plot(fz, sqrt(pz1), '-', 'Color', [0 0.4470 0.7410], 'DisplayName', 'z');
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plot(fz, sqrt(pz2), '--', 'Color', [0 0.4470 0.7410], 'HandleVisibility', 'off');
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plot(fe, sqrt(pe1), '-', 'Color', [0.8500 0.3250 0.0980], 'DisplayName', 'east');
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plot(fe, sqrt(pe2), '--', 'Color', [0.8500 0.3250 0.0980], 'HandleVisibility', 'off');
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plot(fn, sqrt(pn1), '-', 'Color', [0.9290 0.6940 0.1250], 'DisplayName', 'north');
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plot(fn, sqrt(pn2), '--', 'Color', [0.9290 0.6940 0.1250], 'HandleVisibility', 'off');
|
|
hold off;
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|
set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
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|
xlabel('Frequency [Hz]'); ylabel('PSD [m/s/sqrt(Hz)]');
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|
legend('Location', 'northeast');
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|
xlim([0, 500]);
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|
#+end_src
|
|
|
|
#+NAME: fig:compare_axis_psd
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|
#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
|
|
#+begin_src matlab :var filepath="figs/compare_axis_psd.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
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|
<<plt-matlab>>
|
|
#+end_src
|
|
|
|
#+NAME: fig:compare_axis_psd
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|
#+CAPTION: Compare the measure PSD of the two geophones for the three axis
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|
#+RESULTS: fig:compare_axis_psd
|
|
[[file:figs/compare_axis_psd.png]]
|
|
|
|
** Compare TF
|
|
The transfer functions from one geophone to the other are also computed for each axis.
|
|
The result is shown on figure [[fig:compare_tf_axis]].
|
|
|
|
#+begin_src matlab :results none
|
|
[Tz, fz] = tfestimate(z.x1, z.x2, hanning(ceil(length(z.x1)/100)), [], [], 1/(z.t(2)-z.t(1)));
|
|
[Te, fe] = tfestimate(east.x1, east.x2, hanning(ceil(length(east.x1)/100)), [], [], 1/(east.t(2)-east.t(1)));
|
|
[Tn, fn] = tfestimate(north.x1, north.x2, hanning(ceil(length(north.x1)/100)), [], [], 1/(north.t(2)-north.t(1)));
|
|
#+end_src
|
|
|
|
#+begin_src matlab :results none :exports none
|
|
figure;
|
|
ax1 = subplot(2, 1, 1);
|
|
hold on;
|
|
plot(fz, abs(Tz), 'DisplayName', 'z');
|
|
plot(fe, abs(Te), 'DisplayName', 'east');
|
|
plot(fn, abs(Tn), 'DisplayName', 'north');
|
|
hold off;
|
|
set(gca, 'xscale', 'log'); set(gca, 'yscale', 'log');
|
|
set(gca, 'XTickLabel',[]);
|
|
ylabel('Magnitude');
|
|
legend('Location', 'southwest');
|
|
|
|
ax2 = subplot(2, 1, 2);
|
|
hold on;
|
|
plot(fz, mod(180+180/pi*phase(Tz), 360)-180);
|
|
plot(fe, mod(180+180/pi*phase(Te), 360)-180);
|
|
plot(fn, mod(180+180/pi*phase(Tn), 360)-180);
|
|
hold off;
|
|
set(gca, 'xscale', 'log');
|
|
ylim([-180, 180]);
|
|
yticks([-180, -90, 0, 90, 180]);
|
|
xlabel('Frequency [Hz]'); ylabel('Phase');
|
|
|
|
linkaxes([ax1,ax2],'x');
|
|
xlim([1, 500]);
|
|
#+end_src
|
|
|
|
#+NAME: fig:compare_tf_axis
|
|
#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
|
|
#+begin_src matlab :var filepath="figs/compare_tf_axis.pdf" :var figsize="full-tall" :post pdf2svg(file=*this*, ext="png")
|
|
<<plt-matlab>>
|
|
#+end_src
|
|
|
|
#+NAME: fig:compare_tf_axis
|
|
#+CAPTION: Compare the transfer function from one geophone to the other for the 3 axis
|
|
#+RESULTS: fig:compare_tf_axis
|
|
[[file:figs/compare_tf_axis.png]]
|
|
|
|
* Appendix
|
|
** Computation of coherence from PSD and CSD
|
|
<<sec:coherence>>
|
|
#+begin_src matlab :results none
|
|
load('mat/data_001.mat', 't', 'x1', 'x2');
|
|
dt = t(2) - t(1);
|
|
Fs = 1/dt;
|
|
win = hanning(ceil(length(x1)/100));
|
|
#+end_src
|
|
|
|
#+begin_src matlab :results none
|
|
pxy = cpsd(x1, x2, win, [], [], Fs);
|
|
pxx = pwelch(x1, win, [], [], Fs);
|
|
pyy = pwelch(x2, win, [], [], Fs);
|
|
coh = mscohere(x1, x2, win, [], [], Fs);
|
|
#+end_src
|
|
|
|
#+begin_src matlab :results none
|
|
figure;
|
|
hold on;
|
|
plot(f, abs(pxy).^2./abs(pxx)./abs(pyy), '-');
|
|
plot(f, coh, '--');
|
|
hold off;
|
|
set(gca, 'xscale', 'log');
|
|
xlabel('Frequency'); ylabel('Coherence');
|
|
xlim([1, 500]);
|
|
#+end_src
|
|
|
|
#+NAME: fig:comp_coherence_formula
|
|
#+HEADER: :tangle no :exports results :results value raw replace :noweb yes
|
|
#+begin_src matlab :var filepath="figs/comp_coherence_formula.pdf" :var figsize="wide-normal" :post pdf2svg(file=*this*, ext="png")
|
|
<<plt-matlab>>
|
|
#+end_src
|
|
|
|
#+NAME: fig:comp_coherence_formula
|
|
#+CAPTION: Comparison of =mscohere= and manual computation
|
|
#+RESULTS: fig:comp_coherence_formula
|
|
[[file:figs/comp_coherence_formula.png]]
|
|
|
|
* Bibliography :ignore:
|
|
bibliographystyle:unsrt
|
|
bibliography:ref.bib
|