International audienceThe polynomial multiplication problem has attracted considerable attention since the early days of computer algebra, and several algorithms have been designed to achieve the best possible time complexity. More recently, efforts have been made to improve the space complexity, developing modified versions of a few specific algorithms to use no extra space while keeping the same asymptotic running time. In this work, we broaden the scope in two regards. First, we ask whether an arbitrary multiplication algorithm can be performed in-place generically. Second, we consider two important variants which produce only part of the result (and hence have less space to work with), the so-called middle and short products, and ask wh...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This "habilitation à diriger des recherches" manuscript concerns the efficiency in exact linear alge...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
International audiencePolynomial multiplication and its variants are a key ingredient in effective c...
We consider the fast in-place computation of the Euclidean polynomial modular remainder R(X) ≡ A(X) ...
This paper presents several methods for reducing the number of bit operations for multiplication of ...
Efficient arithmetic over finite fields has high relevance both in hardware and software implementat...
AbstractFinding the product of two polynomials is an essential and basic problem in computer algebra...
We here propose simultaneously fast and in-place algorithms for problems where the result of some fo...
Finding the product of two polynomials is an essential and basic prob-lem in computer algebra. While...
In this paper, we first present an enhancement of the well-known Karatsuba 2-way and 3-way algorithm...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
AbstractWe observe that polynomial evaluation and interpolation can be performed fast over a multidi...
Abstract. A polynomial consisting of only the low degree monomials of the (full) product of two univ...
International audienceWe present algorithms to perform modular polynomial multiplication or modular ...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This "habilitation à diriger des recherches" manuscript concerns the efficiency in exact linear alge...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
International audiencePolynomial multiplication and its variants are a key ingredient in effective c...
We consider the fast in-place computation of the Euclidean polynomial modular remainder R(X) ≡ A(X) ...
This paper presents several methods for reducing the number of bit operations for multiplication of ...
Efficient arithmetic over finite fields has high relevance both in hardware and software implementat...
AbstractFinding the product of two polynomials is an essential and basic problem in computer algebra...
We here propose simultaneously fast and in-place algorithms for problems where the result of some fo...
Finding the product of two polynomials is an essential and basic prob-lem in computer algebra. While...
In this paper, we first present an enhancement of the well-known Karatsuba 2-way and 3-way algorithm...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
AbstractWe observe that polynomial evaluation and interpolation can be performed fast over a multidi...
Abstract. A polynomial consisting of only the low degree monomials of the (full) product of two univ...
International audienceWe present algorithms to perform modular polynomial multiplication or modular ...
Can post-Schönhage–Strassen multiplication algorithms be competitive in practice for large input siz...
This "habilitation à diriger des recherches" manuscript concerns the efficiency in exact linear alge...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...