© Josh Alman and Virginia V. Williams. We consider the techniques behind the current best algorithms for matrix multiplication. Our results are threefold. (1) We provide a unifying framework, showing that all known matrix multiplication running times since 1986 can be achieved from a single very natural tensor - the structural tensor Tq of addition modulo an integer q. (2) We show that if one applies a generalization of the known techniques (arbitrary zeroing out of tensor powers to obtain independent matrix products in order to use the asymptotic sum inequality of Schönhage) to an arbitrary monomial degeneration of Tq, then there is an explicit lower bound, depending on q, on the bound on the matrix multiplication exponent ω that one can a...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
Until a few years ago, the fastest known matrix multiplication algorithm, due to Copper-smith and Wi...
Until a few years ago, the fastest known matrix multiplication algorithm, due to Coppersmith and Win...
Determining the asymptotic algebraic complexity of matrix multiplication, succinctly represented by ...
Fast matrix multiplication is one of the most fundamental problems in algorithm research. The expone...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
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...
We present a new method for accelerating matrix multiplication asymptotically. Thiswork builds on re...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
Until a few years ago, the fastest known matrix multiplication algorithm, due to Copper-smith and Wi...
Until a few years ago, the fastest known matrix multiplication algorithm, due to Coppersmith and Win...
Determining the asymptotic algebraic complexity of matrix multiplication, succinctly represented by ...
Fast matrix multiplication is one of the most fundamental problems in algorithm research. The expone...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
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...
We present a new method for accelerating matrix multiplication asymptotically. Thiswork builds on re...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...