Skew-sparse matrix multiplication
Abstract
Based on the observation that Q(p-1) × (p-1) is isomorphic to a quotient skew polynomial ring, we propose a new method for (p-1)× (p-1) matrix multiplication over Q, where p is a prime number. The main feature of our method is the acceleration for matrix multiplication if the product is skew-sparse. Based on the new method, we design a deterministic algorithm with complexity O(Tω-2 p2), where T p-1 is a parameter determined by the skew-sparsity of input matrices and ω is the asymptotic exponent of matrix multiplication. Moreover, by introducing randomness, we also propose a probabilistic algorithm with complexity O(tω-2p2+p21), where t p-1 is the skew-sparsity of the product and is the probability parameter.
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