Sorry, but there is NO magic way to just ignore NaN elements in a matrix to then compute the eigenvalues. You need ALL of the elements in an array to compute the eigenvalues. Tools to check for an NaN or delete the NaNs as others have suggested are simply no use. If you simply delete an element of an array, the array would no longer be square. So MATLAB turns the array into a vector, which is a completely different thing! And converting a NaN into a zero is highly unlikely to yield meaningful eigenvalues for an array.
Nor are tools like nanmean useful, which do a very simple thing. (Nanmean can do its work because it computes the mean of each column, where the NaNs are simply ignored. It just sums the non-NaN elements, then divides by the number of nan-NaNs.)
And finally, if you have an NxM matrix that is not square, it is meaningless to compute the eigenvalues. Eigenvalues are only defined for square matrices. Perhaps you are thinking about singular values, or perhaps you are trying to do principle components. In either of those cases, you will still need the full matrix, unless you intend to simply delete all the rows or columns that have nans in them.
There is no free lunch. You will need to determine the entire matrix to compute the eigenvalues of that matrix. At the very least, you need to rethink your problem, since it is meaningless to try to do as you have asked.