We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on the s-rank of the matrix multiplication tensor imply upper bounds on the ordinary rank. In particular, if the “s-rank exponent of matrix multiplication” equals 2, then ω = 2. This connection between the s-rank exponent and the ordinary exponent enables us to significantly generalize the group-theoretic approach of Cohn and Umans, from group algebras to general algebras. Embedding matrix multiplication into general algebra multiplication yields bounds on s-rank (not ordinary rank) and, prior to this paper, that had been a barrier to working with general algebras. We identify adjacency algebras of coherent configurations as a promising fami...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
We develop a new, group-theoretic approach to bounding the exponent of matrix multiplication. There ...
Determining the asymptotic algebraic complexity of matrix multiplication, succinctly represented by ...
We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
In 2003, Cohn and Umans described a framework for proving upper bounds on the exponent ω of matrix m...
Based on Cohn and Umans’ group-theoretic method, we embed matrix multiplication into several group...
The Cohn-Umans group-theoretic approach to matrix multiplication suggests embedding matrix multiplic...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
In this thesis, we tackle the problem of matrix multiplication complexity. Matrix multiplication, wh...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
We develop a new, group-theoretic approach to bounding the exponent of matrix multiplication. There ...
Determining the asymptotic algebraic complexity of matrix multiplication, succinctly represented by ...
We introduce a relaxation of the notion of tensor rank, called s-rank, and show that upper bounds on...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
Determining the exponent of matrix multiplication ? is one of the central open problems in algebraic...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
In 2003, Cohn and Umans described a framework for proving upper bounds on the exponent ω of matrix m...
Based on Cohn and Umans’ group-theoretic method, we embed matrix multiplication into several group...
The Cohn-Umans group-theoretic approach to matrix multiplication suggests embedding matrix multiplic...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
We present an upper bound on the exponent of the asymptotic behaviour of the tensor rank of a family...
In this thesis, we tackle the problem of matrix multiplication complexity. Matrix multiplication, wh...
textabstractWe show that the border support rank of the tensor corresponding to two-by-two matrix m...
We develop a new, group-theoretic approach to bounding the exponent of matrix multiplication. There ...
Determining the asymptotic algebraic complexity of matrix multiplication, succinctly represented by ...