AbstractAn important class of problems in arithmetic complexity is that of computing a set of bilinear forms, which includes many interesting problems such as the multiplication problems of matrices and polynomials. Recently, this class has been given considerable attention and several interesting results have emerged. However, most of the important issues remain unresolved and the general problem seems to be very difficult. In this paper, we consider one of the simplest cases of the general problem, namely evaluation of bilinear forms with {0, 1} constants, and prove that fording the optimal number of multiplications or the optimal number of additions is NP-hard. We discuss several related problems
We study the complexity of the so called semi-disjoint bilinear forms over different semi-rings, in ...
AbstractWe prove a lower bound of 2mn+2n−m−2 for the bilinear complexity of the multiplication of n×...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
AbstractWe define here the bilinear mincing rank of a bilinear form over a field of the characterist...
We describe a unified framework to search for optimal formulae evaluating bilinear --- or quadratic ...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
We study the complexity of the so called semi-disjoint bilinear forms over different semi-rings, in ...
AbstractWe prove a lower bound of 2mn+2n−m−2 for the bilinear complexity of the multiplication of n×...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
AbstractWe define here the bilinear mincing rank of a bilinear form over a field of the characterist...
We describe a unified framework to search for optimal formulae evaluating bilinear --- or quadratic ...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
We study the complexity of the so called semi-disjoint bilinear forms over different semi-rings, in ...
AbstractWe prove a lower bound of 2mn+2n−m−2 for the bilinear complexity of the multiplication of n×...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...