# Find the minimum non zero value in a matrix

I'm trying to find a 2d array that represents the minimum values of the 3rd dimension in a 3d array., e.g.

``````a = floor(rand(10,10,3).*100); % representative structure
b = min(a,[],3); % this finds the minimum but also includes 0
``````

I tried using:

``````min(a(a>0),3)
``````

but that isn't correct? I guess I could sort the third dimension of a and then find the minimum within 1:depth-1 - but that doesn't seem the most efficient way?

Any thoughts?

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Note that if you sort, the minimum is the second (index 1 if matlab indexes from 0) element, you don't have to find the minimum of `1:depth-1` anymore. But yes, that is still inefficient and there has to be a better way. –  IVlad Jun 27 '12 at 20:04
It should be `min(a,[],3)`, otherwise you take the smaller of `a` and 3 –  Jonas Jun 27 '12 at 20:49
Thanks for pointing that typo out Jonas, I've correct it now. –  trican Jun 28 '12 at 7:46

The problem is that `a(a>0)` returns a linear array, so you'll end up with one minimum, as opposed to a 2D array with minima.

The safest way to take the minimum of non-zero values is to mask them with `Inf`, so that the zeros do not interfere with the calculation of the minimum.

``````tmp = a;
tmp(tmp==0) = Inf;

b = min(tmp,[],3);
``````
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That unfortunately backfires for sparse matrices, since it can be very costly to assign a value to all the zeros in a (large) sparse matrix. I realize that wasn't the OP's question- but just an FYI. –  Brandon Kuczenski Nov 20 '14 at 21:59

One possibility would be to simply make all the zero values very big.

For example, if you know that no elements would ever be larger than 1000 you could use

``````b = min(a+1000*(a==0),[],3)
``````
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use inf instead of 1000 –  Dan Jun 28 '12 at 7:22

simply assign those points infinity where the value is zero so always the min answer will not count zero ones..... like a(a==0)=inf; %then count the min one minelement=min(a);

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