AbstractThe action of commutativity and approximation is analyzed for some problems in Computational Complexity. Lower bound criteria to the approximate complexity are given in terms of border rank and commulative border rank of a given tensor. Upper bounds for the approximate complexity of the matrix-vector product are given. In particular, 12m(n+1) multiplications are necessary and sufficient to approximate n × m matrix-vector product; 6 multiplications are sufficient (5 are needed) to approximate a 2 × 2 matrix product by using commutativity. An application to polynomial evaluation shows that 12n+2 multiplications are sufficient to approximate any n-degree polynomial at a point. For what concerns matrix multiplication complexity a number...
We consider the problem of commutative rank computation of a given matrix space. A matrix space is a...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
In this thesis, we study some of the central problems in algebraic complexity theory through the len...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
In this thesis, we tackle the problem of matrix multiplication complexity. Matrix multiplication, wh...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
We define the complexity of a computational problem given by a relation using the model of a computa...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
AbstractWe consider the computational complexity of some problems dealing with matrix rank. Let E, S...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
AbstractThis paper is devoted to the study of lower bounds on the inherent number of additions and s...
We investigate the algebraic complexity of tensor calulus. We consider a generalization of iterated ...
We consider the problem of commutative rank computation of a given matrix space. A matrix space is a...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
In this thesis, we study some of the central problems in algebraic complexity theory through the len...
AbstractThe action of commutativity and approximation is analyzed for some problems in Computational...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
In this thesis, we tackle the problem of matrix multiplication complexity. Matrix multiplication, wh...
An important building block in all current asymptotically fast algorithms for matrix multiplication ...
We define the complexity of a computational problem given by a relation using the model of a computa...
This is a survey primarily about determining the border rank of tensors, especially those relevant f...
Matrix multiplication is commonly used in scientific computation. Given matrices A = (aij ) of size ...
Determining the complexity of matrix multiplication has been a central problem in complexity theory ...
AbstractWe consider the computational complexity of some problems dealing with matrix rank. Let E, S...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
AbstractThis paper is devoted to the study of lower bounds on the inherent number of additions and s...
We investigate the algebraic complexity of tensor calulus. We consider a generalization of iterated ...
We consider the problem of commutative rank computation of a given matrix space. A matrix space is a...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
In this thesis, we study some of the central problems in algebraic complexity theory through the len...