Recently, Pagh presented a randomized approximation algorithm for the multiplication of real-valued matrices building upon work for detecting the most frequent items in data streams. We continue this line of research and present new deterministic matrix multiplication algorithms. Motivated by applications in data mining, we first consider the case of real-valued, nonnegative n-by-n input matrices A and B, and show how to obtain a deterministic approximation of the weights of individual entries, as well as the entrywise p-norm, of the product AB. The algorithm is simple, space efficient and runs in one pass over the input matrices. For a user defined b in (0, n^2) the algorithm runs in time O(nb + n Sort(n)) and space O(n + b) and returns ...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-reve...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-rev...
Motivated by studying the power of randomness, certifying algorithms and barriers for fine-grained r...
Motivated by studying the power of randomness, certifying algorithms and barriers for fine-grained r...
© 2016 The Author(s)We study the problem of efficiently correcting an erroneous product of two (Form...
We use randomness to exploit the potential sparsity of the Boolean matrix product in order to speed ...
Randomized matrix algorithms have had significant recent impact on numerical linear algebra. One esp...
We use randomness to exploit the potential sparsity of the Boolean matrix product in order to speed ...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
Based on the observation that $\mathbb{Q}^{(p-1) \times (p-1)}$ is isomorphic to a quotient skew pol...
We present new baby steps/giant steps algorithms of asymptotically fast running time for dense matri...
Karppa & Kaski (2019) proposed a novel type of ``broken" or ``opportunistic" multiplication algorith...
AbstractWe present randomized algorithms for the solution of some numerical linear algebra problems....
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-reve...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-rev...
Motivated by studying the power of randomness, certifying algorithms and barriers for fine-grained r...
Motivated by studying the power of randomness, certifying algorithms and barriers for fine-grained r...
© 2016 The Author(s)We study the problem of efficiently correcting an erroneous product of two (Form...
We use randomness to exploit the potential sparsity of the Boolean matrix product in order to speed ...
Randomized matrix algorithms have had significant recent impact on numerical linear algebra. One esp...
We use randomness to exploit the potential sparsity of the Boolean matrix product in order to speed ...
By combining Kaltofen's 1992 baby steps/giant steps technique for Wiedemann's 1986 determinant algor...
Based on the observation that $\mathbb{Q}^{(p-1) \times (p-1)}$ is isomorphic to a quotient skew pol...
We present new baby steps/giant steps algorithms of asymptotically fast running time for dense matri...
Karppa & Kaski (2019) proposed a novel type of ``broken" or ``opportunistic" multiplication algorith...
AbstractWe present randomized algorithms for the solution of some numerical linear algebra problems....
This survey describes probabilistic algorithms for linear algebraic computations, such as factorizin...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-reve...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
Low-rank matrix approximations, such as the truncated singular value decomposition and the rank-rev...