Is there an easy way to remove points from a signal which can be restored by interpolation

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Jonas el 24 de Mayo de 2022

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https://la.mathworks.com/matlabcentral/answers/1726150-is-there-an-easy-way-to-remove-points-from-a-signal-which-can-be-restored-by-interpolation

Editada: Jonas el 8 de Jun. de 2022

Respuesta aceptada: Bruno Luong

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Dear community,

I gues there is already a solutio nout there, but I am not finding the right key wordsw to google it myself:

Imaging having a simpel signal like a straight line, which has 1000 sample points. the lines slope and extent can bestored easily by keeping only the first and last point and inteprolating the others.

going from there we have a piecewise linear signal, which can be stored by e.g. by keeping the maxima and minima.

starting the problems here, how a bout a piecewise linear line with increasing slope.

How can i choose automatically the most important points together with a minimum spacing between points to keep slow changing components and restore the rest of the signal using a specific interpolation method, of course not exact but with a certain error.

This is some kind of compression question and reminds me also a bit of some multi rate signal processing back in the days.

i know of parametrical representation or representation by some transformation coefficients, but how to do something similar directly by storing point coordinates, interpolation method and e.g. interpolation rate

I try to depict it in some simple plots, top we can see the sparse representation using only few points, at the bottom the interpolated variant. How to get from bottom values to top values?

sorry for the long question

best regards

Jonas

close all;

interpT=0:0.5:10;

method='pchip';

% a line

aSparseLine=[1 3];

aSparseLineT=[0 10];

anInterpLine=interp1(aSparseLineT,aSparseLine,interpT,method,NaN);

figure

subplot(2,1,1);

plot(aSparseLineT,aSparseLine,'x');

title('sparse (aim to be saved)')

subplot(2,1,2);

plot(interpT,anInterpLine,'x')

title('full (from where we start)')

% piecewise line

piecewiseLines=[1 3 -4 -1];

piecewiseLinesT=[0 2 6 9];

anInterpPiecewiseLines=interp1(piecewiseLinesT,piecewiseLines,interpT,method,NaN);

figure

subplot(2,1,1);

plot(piecewiseLinesT,piecewiseLines,'x');

title('sparse (aim to be saved)')

subplot(2,1,2);

plot(interpT,anInterpPiecewiseLines,'x')

title('full (from where we start)')

% nasty piecewise line (given sparse representation not on interpolation t -> denser interpolation)

piecewiseLines=[1 3 -4 -1 0];

piecewiseLinesT=[0 2.2 2.6 3.4 9];

newInterpT=0:0.2:10;

anInterpPiecewiseLines=interp1(piecewiseLinesT,piecewiseLines,interpT,method,NaN);

anInterpPiecewiseLinesDenser=interp1(piecewiseLinesT,piecewiseLines,newInterpT,method,NaN);

figure

subplot(2,1,1);

plot(piecewiseLinesT,piecewiseLines,'x');

title('sparse (aim to be saved)')

subplot(2,1,2);

plot(newInterpT,anInterpPiecewiseLinesDenser,'x')

title('full (from where we start)')

hold on;

plot(interpT,anInterpPiecewiseLines,'x')

3 comentarios
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Walter Roberson el 27 de Mayo de 2022

Have you considered using spline()? It will automatically create a piecewise cubic polynomial

Jonas el 8 de Jun. de 2022

Editada: Jonas el 8 de Jun. de 2022

@Jan I'm asking to remove as many knots from the as possible since the interpolation itself will often suffice to reproduce the original signal (with many knots).

I think knot free interpolation posted below is what I am searching for, but is there also a ways to adjust to another interpolation method?

the background of this question is actually a completly practical question. I created a gui which lets the user itself place points on a spectral representation to mark the fundamental frequency. since this can be a long process, there is also the possibility to add those points using matlab's pitch() function. Since this function has its flaws and the user should be able to manually correct those errors, it would be nice to have fewer points but shape preserving, since the user has to click each point individually to delete.

I am asking for other interpolation method than spline since often I find the pchip method would be easier to handle for hard transitions and breaks in f0

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