Sign up ×
Stack Overflow is a community of 4.7 million programmers, just like you, helping each other. Join them; it only takes a minute:

This is probably a very easy question, but all the sources I have found on interpolation in Matlab are trying to correlate two values, all I wanted to benefit from is if I have data which is collected over an 8 hour period, but the time between data points is varying, how do I adjust it such that the time periods are equal and the data remains consistent?

Or to rephrase from the approach I have been trying: I have GPS lat,lon and Unix time for these points; what I want to do is take the lat and lon at time 1 and time 3 and for the case where I don't know time 2, simply fill it with data from time 1 - is there a functional way to do this? (I know in something like Python Pandas you can use fill) but I'm unsure of how to do this in Matlab.

share|improve this question

5 Answers 5

You can look into fitting methods in MATLAB. For example you can look at polyfit or splines. Let's look at polyfit, the way to use it is:

P = polyfit(X,Y,N);

Here X is your time data, and Y is your GPS data measured at time values in X. And N is the order of polynomial. When you calculate P then you can use polyval function as:

Y1 = polyval(P,X1);

Here X1 are uniform time samples for example X1=[1 2 3 4 5 6 7 8] in your case and Y1 will be the estimated data at those times, P is what you calculated using polyfit.

share|improve this answer

What you can do is use interp1 function. This function will fit in deifferent way the numbers for a new X series. For example if you have x=[1 3 5 6 10 12] y=[15 20 17 33 56 89]

This means if you want to fill in for x1=[1 2 3 4 5 6 7 ... 12], you will type y1=interp1(x,y,x1)

share|improve this answer

You might try something along the lines of this:

 resampledTime = min(unixTime):resampleInterval:max(unixTime);
 resampledLat = interp1(time,lat,resampledTime);
 resampledLon = interp1(time,lon,resampledTime);

By default, this returns 1-dimensional linear interpolation. For more info, see help interp1

share|improve this answer

There is a MATLAB function called interparc.m which will benefit you. It fits a cubic spline through the points and divides the resulting line into equal arc-lengths (depending on the number of points entered by the user)

share|improve this answer

I think you are looking for a "zero-order-hold" interpolation a.k.a "nearest neighbor"

Why don't you try interp with method 'nearest'?

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.