We study the complexity of the so called semi-disjoint bilin-ear forms over different semi-rings, in particular the n-dimensional vector convolution and n × n matrix product. We consider a powerful unit-cost computational model over the ring of integers allowing for several addi-tional operations and generation of large integers. We show the following dichotomy for such a powerful model: while almost all arithmetic semi-disjoint bilinear forms have the same asymptotic time complexity as that yielded by naive algorithms, matrix multiplication, the so called distance matrix product, and vector convolution can be solved in a linear number of steps. It follows in particular that in order to obtain a non-trivial lower bounds for these three basi...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThis paper is devoted to the study of lower bounds on the inherent number of additions and s...
We study the complexity of the so called semi-disjoint bilinear forms over different semi-rings, in ...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
We study the monotone circuit complexity of the so called semi-disjoint bilinear forms over the Bool...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
In this paper, a general lower bound on the monotone network complexity of semidisjoint bilinear for...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
Algebraic complexity theory, the study of the minimum number of operations suficient to perform alge...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThis paper is devoted to the study of lower bounds on the inherent number of additions and s...
We study the complexity of the so called semi-disjoint bilinear forms over different semi-rings, in ...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
We study the monotone circuit complexity of the so called semi-disjoint bilinear forms over the Bool...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractWe wish to answer the following question: p matrices Bi, of the same dimension, being given,...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
In this paper, a general lower bound on the monotone network complexity of semidisjoint bilinear for...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractWe present several bilinear algorithms for the acceleration of multiplication of n X n matri...
Algebraic complexity theory, the study of the minimum number of operations suficient to perform alge...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
AbstractThis paper is devoted to the study of lower bounds on the inherent number of additions and s...