# Where do I find the memory requirements of a MATLAB function?

I have a 3D array of values (0 or 1), which is very large (approx 2300x2300x11). I want to fit a surface to these values using for example `interp3`, but when I try MATLAB runs out of memory. Thus, I've decided to reduce the size of my array enough for MATLAB to accomodate it in memory.

Now, the smaller I make the reduced array, the worse my results will be (the surface fitting is part of a measurement process with high precision requirements), so I want to reduce the array as little as possible.

Is there any way to determine on beforehand how much memory a certain array size will demand and how much memory is available, and then use this information to resize the array enough to avoid out of memory exceptions, but not more?

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You can look at the maximum array sizes that are supported on different platforms. In general, if you have a `PxQxR` sized 3D array of `double`s, then the size of your array in bytes is `P*Q*R*8`. For your matrix, the size is ~ 444 MB. You can also try reducing it to a `single`, using `single(A)`. `single` uses 4 bytes per element and you can reduce the size of your array by a factor 2.

I haven't really poked into the inner workings of `interp3`, but the exact memory requirements will depend on the interpolation option you choose. So, you can first try to convert it to `single` and see if it works. If not, try with 80% (90%) of the number of rows and columns. This way you have a good chunk of the original array, but the memory requirement is only 64% (81%) of the original.

If that doesn't help, duffymo's suggestion is what you should be looking into.

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I don't know the answer to this, but I wonder if you can have your cake and eat it, too.

If your data set is too big, why not do a piecewise fit? Do it in chunks rather than omitting data points.

Or be smarter about how you omit data points. You want them in areas of high curvature - where your data is changing fastest. Leave out points in areas far away from the action, where nothing interesting is happening. You might have to do a fit, look at the surface, add and remove more points and try again.

It might an iterative process, but I'll bet you'll be able to get a nice fit with a little luck and effort.

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