The evaluation of the product of two matrices can be very computationally expensive. The multiplication of two n×n matrices, using the “default” algorithm can take O(n3) field operations in the underlying field k. It is therefore desirable to find algorithms to reduce the “cost” of multiplying two matrices together. If multiplication of two n × n matrices can be obtained in O(nα) operations, the least upper bound for α is called the exponent of matrix multiplication and is denoted by ω. A bound for ω < 3 was found in 1968 by Strassen in his algorithm. He found that multiplication of two 2 × 2 matrices could be obtained in 7 multiplications in the underlying field k, as opposed to the 8 required to do the same multiplication previous...
AbstractThis paper develops optimal algorithms to multiply an n × n symmetric tridiagonal matrix by:...
Researchers Cohn and Umans proposed a framework for fast matrix multiplication algorithms. Their app...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
AbstractWe give a constant α > 0.294 and, for any ε > 0, an algorithm for multiplying anN×Nmatrix by...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
Matrix multiplication (hereafter we use the acronym MM) is among the most fundamental operations of ...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
In 2003 Cohn and Umans introduced a new group-theoretic framework for doing fast matrix multiplicati...
On cap sets and the group-theoretic approach to matrix multiplication, Discrete Analysis 2017:3, 27p...
These notes are based on a lecture given at the Toronto Student Seminar on February 2, 2012. The mat...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
AbstractThis paper develops optimal algorithms to multiply an n × n symmetric tridiagonal matrix by:...
Researchers Cohn and Umans proposed a framework for fast matrix multiplication algorithms. Their app...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
In this work, we prove limitations on the known methods for designing matrix multiplication algorith...
AbstractWe give a constant α > 0.294 and, for any ε > 0, an algorithm for multiplying anN×Nmatrix by...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
Matrix multiplication (hereafter we use the acronym MM) is among the most fundamental operations of ...
AbstractThe paper is a systematic survey of recently developed methods for the acceleration of MM, m...
Let M(n) denote the bit complexity of multiplying n-bit integers, let ω ∈ (2, 3] be an exponent for ...
In 2003 Cohn and Umans introduced a new group-theoretic framework for doing fast matrix multiplicati...
On cap sets and the group-theoretic approach to matrix multiplication, Discrete Analysis 2017:3, 27p...
These notes are based on a lecture given at the Toronto Student Seminar on February 2, 2012. The mat...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
AbstractThis paper develops optimal algorithms to multiply an n × n symmetric tridiagonal matrix by:...
Researchers Cohn and Umans proposed a framework for fast matrix multiplication algorithms. Their app...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...