Let x be a column vector of indeterminates. We show that the complexity of computing the linear forms Ax for a fixed matrix A is essentially the same as that of computing the linear forms A'x where the prime denotes transpose. Our result also holds for non-square matrices, under a simple restriction
We define the complexity of a computational problem given by a relation using the model of a computa...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Recently, the interest to polynomial representations of functions over finite fields and over finite...
Let x be a column vector of indeterminates. We show that the complexity of computing the linear form...
AbstractLet A be a matrix whose entries are indeterminates over an infinite field. It is shown that,...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
Let M be an s ×t matrix and let M T be the transpose of M . Let x and y be t - and s -dimensional...
AbstractIn this paper the problem of complexity of multiplication of a matrix with a vector is studi...
The linear complexity of a matrix is a measure of the number of additions, subtractions, and scalar ...
AbstractWe introduce three formal theories of increasing strength for linear algebra in order to stu...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
We introduce three formal theories of increasing strength for linear algebra in order to study the c...
We introduce three formal theories of increasing strength for linear algebra in order to study the ...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
We define the complexity of a computational problem given by a relation using the model of a computa...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Recently, the interest to polynomial representations of functions over finite fields and over finite...
Let x be a column vector of indeterminates. We show that the complexity of computing the linear form...
AbstractLet A be a matrix whose entries are indeterminates over an infinite field. It is shown that,...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
Let M be an s ×t matrix and let M T be the transpose of M . Let x and y be t - and s -dimensional...
AbstractIn this paper the problem of complexity of multiplication of a matrix with a vector is studi...
The linear complexity of a matrix is a measure of the number of additions, subtractions, and scalar ...
AbstractWe introduce three formal theories of increasing strength for linear algebra in order to stu...
We revisit a well studied linear algebraic problem, computing the rank and determinant of matrices, ...
We introduce three formal theories of increasing strength for linear algebra in order to study the c...
We introduce three formal theories of increasing strength for linear algebra in order to study the ...
One of the central problems of algebraic complexity theory is the complexity of multiplication in al...
We define the complexity of a computational problem given by a relation using the model of a computa...
We estimate the Boolean complexity of multiplication of structured matrices by a vector and the solu...
Recently, the interest to polynomial representations of functions over finite fields and over finite...