The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when Strassen surprisingly decreased the exponent 3 in the cubic cost of the straightforward classical MM to log 2 (7) ≈ 2.8074. Applications to some fundamental problems of Linear Algebra and Computer Science have been immediately recognized, but the researchers in Computer Algebra keep discovering more and more applications even today, with no sign of slowdown. We survey the unfinished history of decreasing the exponent towards its information lower bound 2, recall some important techniques discovered in this process and linked to other fields of computing, reveal sample surprising applications to fast computation of the inner products of two v...
A tight Ω((n/M ̅ ̅√)log27M) lower bound is derived on the I/O complexity of Strassen’s algorithm to ...
Fast algorithms for matrix multiplication, namely those that perform asymptotically fewer scalar ope...
This paper aims at a friendly introduction to the field of fast algorithms for polynomial matrices, ...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
Matrix multiplication (hereafter we use the acronym MM) is among the most fundamental operations of ...
AbstractThe method of trilinear aggregating with implicit canceling for the design of fast matrix mu...
Matrix multiplication is a core building block for numerous scientific computing and, more recently,...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
AbstractThe main purpose of this paper is to present a fast matrix multiplication algorithm taken fr...
THIS PAPER HAS BEEN WITHDRAWN. We briefly discuss the error which was made in the original version o...
A tight Ω((n/M ̅ ̅√)log27M) lower bound is derived on the I/O complexity of Strassen’s algorithm to ...
Fast algorithms for matrix multiplication, namely those that perform asymptotically fewer scalar ope...
This paper aims at a friendly introduction to the field of fast algorithms for polynomial matrices, ...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
Matrix multiplication (hereafter we use the acronym MM) is among the most fundamental operations of ...
AbstractThe method of trilinear aggregating with implicit canceling for the design of fast matrix mu...
Matrix multiplication is a core building block for numerous scientific computing and, more recently,...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
AbstractThe numbers of bit operations (bt) required for matrix multiplication (MM), matrix inversion...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
AbstractThe main purpose of this paper is to present a fast matrix multiplication algorithm taken fr...
THIS PAPER HAS BEEN WITHDRAWN. We briefly discuss the error which was made in the original version o...
A tight Ω((n/M ̅ ̅√)log27M) lower bound is derived on the I/O complexity of Strassen’s algorithm to ...
Fast algorithms for matrix multiplication, namely those that perform asymptotically fewer scalar ope...
This paper aims at a friendly introduction to the field of fast algorithms for polynomial matrices, ...