AbstractIt is well known that integers or polynomials can be multiplied in an asymptotically fast way using the discrete Fourier transform. In this paper, we give an analogue of fast Fourier multiplication in the ring of skew polynomials C [ x, δ ], where δ=x∂∂x. More precisely, we show that the multiplication problem of linear differential operators of degree n in x and degree n in δ can be reduced to the n×n matrix multiplication problem
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This dissertation reviews the theory of fast matrix multiplication from a multilinear-algebraic poin...
AbstractIt is well known that integers or polynomials can be multiplied in an asymptotically fast wa...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
13 pagesIn this paper, we study the complexity of several basic operations on linear differential op...
International audienceWe show that linear differential operators with polynomial coefficients can be...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
International audienceIt is known that multiplication of linear differential operators over ground f...
Trosième versionLet C[[z]] be the ring of power series over an effective ring C. In [BK78], it was f...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
AbstractLet C[[z]] be the ring of power series over an effective ring C. In Brent and Kung (1978), i...
AbstractConsider the Vandermonde-like matrix P:=(Pk(xM,l))l,k=0M,N, where the polynomials Pk satisfy...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This dissertation reviews the theory of fast matrix multiplication from a multilinear-algebraic poin...
AbstractIt is well known that integers or polynomials can be multiplied in an asymptotically fast wa...
Since 1960 and the result of Karatsuba, we know that the complexity of the multiplication (of intege...
13 pagesIn this paper, we study the complexity of several basic operations on linear differential op...
International audienceWe show that linear differential operators with polynomial coefficients can be...
AbstractThe complexity of matrix multiplication has attracted a lot of attention in the last forty y...
Depuis 1960 et le résultat fondateur de Karatsuba, on sait que la complexité de la multiplication (d...
International audienceIt is known that multiplication of linear differential operators over ground f...
Trosième versionLet C[[z]] be the ring of power series over an effective ring C. In [BK78], it was f...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
We study the link between the complexity of polynomial matrix multiplication and the complexity of s...
AbstractLet C[[z]] be the ring of power series over an effective ring C. In Brent and Kung (1978), i...
AbstractConsider the Vandermonde-like matrix P:=(Pk(xM,l))l,k=0M,N, where the polynomials Pk satisfy...
AbstractFirst we study asymptotically fast algorithms for rectangular matrix multiplication. We begi...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This dissertation reviews the theory of fast matrix multiplication from a multilinear-algebraic poin...