Consider building the index and data vectors and calling sparse once using those vectors. See the "Accumulate Values into Sparse Matrix" example on the documentation page for an example that builds a sparse matrix using those vectors. You'll have two "pieces" of each vector: one piece for the main diagonal and one piece for the super-diagonal.
I'm trying to create a n by n sparse matrix with 3*xi-xi^2 on the main diagonal of K, and with with 6*xi on the sup-diagonal of K , where i starts from 1 to n. And everywhere else 0. Can anyone please tell me how to get that ?
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Before I created a matrix that the main diagonal of K are alternatively 2 and -2’s, the sub- and sup-diagonal of K alternatively 1 and -1’s, and everywhere else 0.
n = 5;
k = mod(1:n,2)*2 - 1;
A = diag(k*2) + diag(k(1:n-1),-1) + diag(k(1:n-1),1)
But since now the number on the diagonal has to be different. I can't use this approach.
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