cubic spline interpolation and upsample ?
Mostra commenti meno recenti
Write down a routine which upsamples the recorded speech by M and uses
cubic spline interpolation on the data to replace the zero samples. Cubic spline
interpolation routines exist in MATLAB toolboxes. You can use lookfor
command of MATLAB to find out how to do it. Then play the upsampled data
for M = 2 and comment on the effect of upsampling in terms of frequency
changes.
[y,Fs]= audioread('sound.wav');
Y=upsample(y,2)
I did the upsampling but couldn't figure out cubic spline interpolation.
2 Commenti
John D'Errico
il 14 Gen 2017
What did you find when you tried this:
lookfor spline
Why did you not try that?
Eren Çiftçi
il 14 Gen 2017
Risposte (3)
Star Strider
il 14 Gen 2017
Modificato: Star Strider
il 14 Gen 2017
0 voti
Consider that you were told to ‘resample’ your signal, so you should be searching on ‘resample’, not ‘spline’. You will find the resample function, and particularly the method argument section that should guide you to the solution you want.
EDIT — Note that the resample function incorporates a FIR anti-aliasing filter. This is absolutely necessary for signal processing applications. Interpolation without the anti-aliasing filter will not produce reliable results for signal processing purposes.
1 Commento
Charalambos Hadjipanayi
il 17 Dic 2021
Why do you need the anti-aliasing filter if you are up-sampling? Doesn't aliasing occur when you downsample?
Image Analyst
il 14 Gen 2017
See my spline demo:
% Demo to show spline interpolation.
% Clean up / initialize
clc;
close all;
clear all;
workspace; % Display workspace panel.
% Create the original knot points.
lengthX = 10;
x = 1:lengthX;
y = rand (lengthX,1);
% Plot it and show how the line has sharp bends.
plot(x, y, '-sr', 'LineWidth', 2);
set(gcf, 'Position', get(0,'Screensize')); % Maximize figure.
% Use splines to interpolate a smoother curve,
% with 10 times as many points,
% that goes exactly through the same data points.
samplingRateIncrease = 10;
newXSamplePoints = linspace(1, lengthX, lengthX * samplingRateIncrease);
smoothedY = spline(x, y, newXSamplePoints);
% Plot smoothedY and show how the line is
% smooth, and has no sharp bends.
hold on; % Don't destroy the first curve we plotted.
plot(newXSamplePoints, smoothedY, '-ob');
title('Spline Interpolation Demo', 'FontSize', 20);
legend('Original Points', 'Spline Points');
% Mathworks Demo code from their Help
% x = 0:10;
% y = sin(x);
% xx = 0:.25:10;
% yy = spline(x,y,xx);
% plot(x,y,'o',xx,yy)
slopes = [0, diff(smoothedY)];
plot(newXSamplePoints, slopes, 'k-', 'LineWidth', 3);
% Draw x axis
line(xlim, [0,0], 'Color', 'k', 'LineWidth', 2);
grid on;
legend('Original Points', 'Spline Points', 'Slope');
4 Commenti
Eren Çiftçi
il 14 Gen 2017
Modificato: Eren Çiftçi
il 16 Gen 2017
Image Analyst
il 14 Gen 2017
Eren, you do know that you can't fit a cubic through just 2 points, don't you? I assume you know the basics of a line needing at least 2 points, a quadratic needing at least 3 points, and a cubic needing at least 4 points, and a polynomial of degree n needing at least (n+1) points. So are you really surprised that you get garbage when you try to use only 2 points to fit a cubic spline? Try it again with at least 4 points.
Eren Çiftçi
il 16 Gen 2017
Modificato: Eren Çiftçi
il 16 Gen 2017
Image Analyst
il 16 Gen 2017
So what's the problem? Just replace my data with your data in my code. Did you do that?
kevin cobley
il 28 Feb 2017
Modificato: kevin cobley
il 28 Feb 2017
0 voti
try 'interp1("original sampletimes","samples","new sample times")'
thats it.. (but you should understand how spline interpolation works, and its relation to matrix algebra... search youtube for cubic spline interpolation - its beautiful stuff..)
2 Commenti
N/A
il 13 Dic 2021
is there a function for polynomial interpolation
Image Analyst
il 13 Dic 2021
Cubic spline is a polynomial interpolation using third order polynomials.
Maybe you could try to do a linear upsampling to get more points, and then use sgolayfilt() if you want some different order.
Categorie
Scopri di più su Spline Postprocessing in Centro assistenza e File Exchange
Prodotti
il 14 Gen 2017
il 17 Dic 2021
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
