Integral average of y values with respect to x values

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I have two vectors (x and y) of the same size with x having more than one value in the y direction. For example, x is [0.02 0.02 0.03 0.03 0.03 0.04 0.04 0.05 0.05 0.05] and y is [0.23 0.40 0.12 0.16 0.09 0.50 0.02 0.33 0.10 0.08]. I want to convert the attached scattered plot of the two vectors to a simple continuous curve, by evaluating the integral average of y values with respect to x values. Take into account that the x vector is already ordered from small to large values. How could I do this? Thank you in advance.
  1 Commento
Image Analyst
Image Analyst il 5 Ott 2015
"I have two vectors (x and y) of the same size with x having more than one value in the y direction" Huh? Does it have one more, or are x and y the same length? Not sure what you're saying. Are you saying that for any given x value, it may be in the x array more than once, with each occurrence of that x value having a different y value stored at corresponding indexes in the y array?

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Star Strider
Star Strider il 4 Ott 2015
I’m not exactly certain what you want, but one approach would be to use the cumtrapz function:
x = [0.02 0.02 0.03 0.03 0.03 0.04 0.04 0.05 0.05 0.05];
y = [0.23 0.40 0.12 0.16 0.09 0.50 0.02 0.33 0.10 0.08];
I = cumtrapz(x,y); % Integrated Vector Of ‘y’ w.r.t. ‘x’
figure(1)
plot(x, I)
grid
  7 Commenti
matnewbie
matnewbie il 5 Ott 2015
Modificato: matnewbie il 5 Ott 2015
You can find the "input.csv" file with the data attached, and here is the code I use to load and sort the data.
clc,close all,clear all
fileID=fopen('input.csv');
C=textscan(fileID,'%f,%f,%f,%f,%f,%f,%f,%f');
A=cell2mat(C); % loads the values in A
fclose(fileID);
N=size(A,1);
grid_size=3e-4; %size of grid element
Rcol=0.0105; %radius
X=A(:,7)-Rcol-grid_size; %translation of x coordinate
Y=A(:,8)-Rcol-grid_size; %translation of y coordinate
r=sqrt(X.^2+Y.^2); %radial position
axial_vel=A(:,2); %velocity component in the axial direction
% Cutting off values outside the region of interest
tol=1e-8; %tolerance for velocity cutoff
j=1;
for i=1:N
if axial_vel(i)>tol
R(j)=r(i);
V(j)=axial_vel(i);
j=j+1;
end
end
figure
plot(R,V,'r.')
[Rsorted, SortIndex] = sort(R);
Vsorted = V(SortIndex);
figure
plot(Rsorted,Vsorted,'b.')
The idea is to obtain a smoothed continuous curve for the integral average... I tried the filter function, but I can't get what I need.
Star Strider
Star Strider il 5 Ott 2015
I would experiment with the filter order and use filtfilt if you have the Signal Processing Toolbox. This gave what appeared to me to be close to what you want:
N = 50; % Length Of Filter
b = ones(1,N); % Filter Coefficients
a = N; % Filter Coefficients
sf = filtfilt(b, a, Vsorted); % Filter Data
I experimented with filter lengths ranging from 50 to 200 and it seemed to give the result you illustrated. It is not possible to design a typical low-pass filter because your data are not regularly sampled. It would be necessary to interpolate your data (using interp1 if your data meet its requriements) to a regularly-sampled time base (here Rsorted) to design a filter for it. That could make the curve smoother, but I can’t promise that it would be.
The first step after interpolation would be to do a fft in order to determine what frequencies you want to exclude as noise. When you decide on a cutoff frequency for your low-pass filter, I would then use the filter design procedure I outlined here.

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Più risposte (1)

arich82
arich82 il 5 Ott 2015
Modificato: arich82 il 5 Ott 2015
[edited to fix typo in comments, and clean-up useless clutter]
Perhaps try combining the filter solution with the accumarray (or filtfilt, if you have the appropriate toolbox, which I do not):
x = Rsorted(:).';
y = Vsorted(:).';
% compute average y for each unique x
[c, ic, ia] = unique(x);
sums = accumarray(ia, y);
wgts = accumarray(ia, ones(size(y))); % weights, i.e. number of reps
avgs = sums./wgts;
% interpolate data on regular grid
n = numel(c); % or some other number
xq = linspace(c(1), c(end), n);
yq = interp1(c, avgs, xq);
% filter gridded data
windowSize = 50;
a = windowSize;
b = ones(1, windowSize);
yf = filter(b, a, yq);
% plot results
hold all;
plot(xq, yf, 'r-', 'LineWidth', 3)
  4 Commenti
matnewbie
matnewbie il 7 Ott 2015
Yes, you're right: with filtfilt the results are more similar to those obtained by Star Strider (magenta line in the plot).
Star Strider
Star Strider il 7 Ott 2015
In my latest Comment (5 Oct 2015 at 21:09), I used filtfilt.

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