In 1969, V. Strassen improves the classical~2x2 matrix multiplication algorithm. The current upper bound for 3x3 matrix multiplication was reached by J.B. Laderman in 1976. This note presents a geometric relationship between Strassen and Laderman algorithms. By doing so, we retrieve a geometric formulation of results very similar to those presented by O. Sykora in 1977
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
In this thesis it is showed how an \(O(n^{4-\epsilon})\) algorithm for the cube multiplication probl...
matician, announced a clever algorithm to reduce the asymptotic complexity of n × n matrix multiplic...
In 1969, V. Strassen improves the classical~2x2 matrix multiplication algorithm. The current upper ...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Strassen\u27s 1969 algorithm for fast matrix multiplication is based on the possibility to multiply ...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
Despite its importance, all proofs of the correctness of Strassen's famous 1969 algorithm to multipl...
The Strassen algorithm for multiplying 2 x 2 matrices requires seven multiplications and 18 addition...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
AbstractTensor product notation is used to derive an iterative version of Strassen's matrix multipli...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
The Strassen algorithm for multiplying $2 \times 2$ matrices requires seven multiplications and 18 ...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
In this thesis it is showed how an \(O(n^{4-\epsilon})\) algorithm for the cube multiplication probl...
matician, announced a clever algorithm to reduce the asymptotic complexity of n × n matrix multiplic...
In 1969, V. Strassen improves the classical~2x2 matrix multiplication algorithm. The current upper ...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Strassen\u27s 1969 algorithm for fast matrix multiplication is based on the possibility to multiply ...
© 2018 IEEE. We study the known techniques for designing Matrix Multiplication algorithms. The two ...
Despite its importance, all proofs of the correctness of Strassen's famous 1969 algorithm to multipl...
The Strassen algorithm for multiplying 2 x 2 matrices requires seven multiplications and 18 addition...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
AbstractTensor product notation is used to derive an iterative version of Strassen's matrix multipli...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
Matrix multiplication is a basic operation of linear algebra, and has numerous applications to the t...
The Strassen algorithm for multiplying $2 \times 2$ matrices requires seven multiplications and 18 ...
This is the first in a series of papers on rank decompositions of the matrix multiplication tensor. ...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
In this thesis it is showed how an \(O(n^{4-\epsilon})\) algorithm for the cube multiplication probl...
matician, announced a clever algorithm to reduce the asymptotic complexity of n × n matrix multiplic...