It sounds like a for loop would build your matrix nicely:
n = 2000;
sz_i = n;
sz_j = n;
A = zeros(sz_i, sz_j); % Preallocate your memory
for ix=1:sz_i
for jx=1:sz_j
A(ix, jx) = 1/(ix+jx-1);
end
end
disp(size(A))
disp(A(1:4,1:4))
Or is the formula more complex than what you've posted? If you have a general expression, you could wrap that by the loop and pass the index arguments.
For a one-off on a modern machine, this is plenty fast to construct, but you might hit some memory trouble at larger n. It's not sparse. It seems like the analysis is well-suited to a parallel implementation. How many values of n are we talking about and how complex is the analysis? Do the different size A's need to interact?
