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I am wondering what is the time complexity of the following expression:

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where A and Y are n×n sparse matrices with nnz non-zeros, and x and y are n×1 vectors.

I found (A*A*A)*x would be more efficient if we compute it as A*(A*(A*x)). So is there some memorization techniques I can use to efficiently compute this expression?

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Two questions, 1st why do you think that computing A*(A*(A*x)) is more efficient than (A*A*A)*x? And what do you want to memorize in this scenario? –  Thomas Jungblut Sep 9 '12 at 11:16
@ThomasJungblut: A*(A*(Ax)) is 3 times multiplying matrix with vector, while (AAA)*x is multiplying matrices twice and then multiplying matrix with vector. Theoretically - there are much less ops in Matrixvector then in Matrix*Matrix. –  amit Sep 9 '12 at 13:17
@amit thanks for the clarification –  Thomas Jungblut Sep 9 '12 at 13:29
@ThomasJungblut, maybe memorize y^T * Y –  John Smith Sep 10 '12 at 1:54

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