AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of direct sums of bilinear forms. For this class of problems we show that the bilinear complexity of one direct sum is the sum of the bilinear complexities of the summands and that every minimal bilinear algorithm for computing the direct sums is a direct-sum algorithm. We also exhibit some sets of bilinear forms which belong to this class
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractA straight-line additive computation which computes a set A of linear forms can be presented...
In the paper we formulate a criterion for the nonsingularity of a bilinear form on a direct sum of ...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractWe prove the direct sum conjecture for various sets of systems of bilinear forms. Our result...
AbstractWe consider the quadratic complexity of certain sets of quadratic forms. We study classes of...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractWe define here the bilinear mincing rank of a bilinear form over a field of the characterist...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
Let U, V, W be finite dimensional vector spaces over a field k and let : U x V → W be a bilinear map...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
We describe a unified framework to search for optimal formulae evaluating bilinear --- or quadratic ...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractA straight-line additive computation which computes a set A of linear forms can be presented...
In the paper we formulate a criterion for the nonsingularity of a bilinear form on a direct sum of ...
AbstractWe consider the bilinear complexity of certain sets of bilinear forms. We study a class of d...
AbstractWe prove the direct sum conjecture for various sets of systems of bilinear forms. Our result...
AbstractWe consider the quadratic complexity of certain sets of quadratic forms. We study classes of...
AbstractThe number of nonscalar multiplications required to evaluate a general family of bilinear fo...
AbstractAlthough general theories are beginning to emerge in the area of automata based complexity t...
AbstractAn important class of problems in arithmetic complexity is that of computing a set of biline...
AbstractWe define here the bilinear mincing rank of a bilinear form over a field of the characterist...
AbstractIn this paper we study the bilinear complexity of multiplying two arbitrary elements from an...
Let U, V, W be finite dimensional vector spaces over a field k and let : U x V → W be a bilinear map...
AbstractAlgebraic schemes of computation of bilinear forms over various rings of scalars are examine...
AbstractWe introduce a new and easily applicable criterion called rank immunity for estimating the m...
We describe a unified framework to search for optimal formulae evaluating bilinear --- or quadratic ...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractA straight-line additive computation which computes a set A of linear forms can be presented...
In the paper we formulate a criterion for the nonsingularity of a bilinear form on a direct sum of ...