This dissertation reviews the theory of fast matrix multiplication from a multilinear-algebraic point of view, as well as recent fast matrix multiplication algorithms based on discrete Fourier transforms over nite groups. To this end, the algebraic approach is described in terms of group algebras over groups satisfying the triple product Property, and the construction of such groups via uniquely solvable puzzles. The higher order singular value decomposition is an important decomposition of tensors that retains some of the properties of the singular value decomposition of matrices. However, we have proven a novel negative result which demonstrates that the higher order singular value decomposition yields a matrix multiplication algor...
Matrix multiplication is one of the most widely used operations in all computational fields of linea...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThe method of trilinear aggregating with implicit canceling for the design of fast matrix mu...
Recent work has shown that fast matrix multiplication algorithms can be constructed by embedding the...
Matrix multiplication is a core building block for numerous scientific computing and, more recently,...
Researchers Cohn and Umans proposed a framework for fast matrix multiplication algorithms. Their app...
In 2003 Cohn and Umans introduced a new group-theoretic framework for doing fast matrix multiplicati...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
AbstractThe recent progress in the asymptotic acceleration of matrix multiplication and of related m...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
Based on Cohn and Umans’ group-theoretic method, we embed matrix multiplication into several group...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
In this thesis it is showed how an \(O(n^{4-\epsilon})\) algorithm for the cube multiplication probl...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
Matrix multiplication is one of the most widely used operations in all computational fields of linea...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThe method of trilinear aggregating with implicit canceling for the design of fast matrix mu...
Recent work has shown that fast matrix multiplication algorithms can be constructed by embedding the...
Matrix multiplication is a core building block for numerous scientific computing and, more recently,...
Researchers Cohn and Umans proposed a framework for fast matrix multiplication algorithms. Their app...
In 2003 Cohn and Umans introduced a new group-theoretic framework for doing fast matrix multiplicati...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
We further develop the group-theoretic approach to fast matrix multiplication introduced by Cohn and...
AbstractThe recent progress in the asymptotic acceleration of matrix multiplication and of related m...
The complexity of matrix multiplication (hereafter MM) has been intensively studied since 1969, when...
Based on Cohn and Umans’ group-theoretic method, we embed matrix multiplication into several group...
The exponent of matrix multiplication is the smallest real number ω such that for all ε>0, O(n^(ω+ε)...
In this thesis it is showed how an \(O(n^{4-\epsilon})\) algorithm for the cube multiplication probl...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
Matrix multiplication is one of the most widely used operations in all computational fields of linea...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThe method of trilinear aggregating with implicit canceling for the design of fast matrix mu...