In this paper we present various algorithms for multiplying multivariate polynomials and series. All algorithms have been implemented in the C++ libraries of the Mathemagix system. We describe naive and softly optimal variants for various types of coefficients and supports and compare their relative performances. For the first time we are able to observe the benefit of non naive arithmetic for multivariate polynomials and power series, which might lead to speed-ups in several areas of symbolic and numeric computation. For the sparse representation, we present new softly linear algorithms for the product whenever the destination support is known, together with a detailed bit-complexity analysis for the usual coefficient types. As an applicat...
We obtain new lower bounds on the number of non zeros of sparse polynomials and give a fully polynom...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
AbstractWe elaborate on a correspondence between the coefficients of a multivariate polynomial repre...
In this paper we present various algorithms for multiplying multivariate polynomials and series. All...
AbstractA new algorithm for sparse multivariate polynomial interpolation is presented. It is a multi...
We provide a comprehensive presentation of algorithms, data structures, and implementation technique...
How should one design and implement a program for the multiplication of sparse polynomials? This is ...
AbstractWe observe that polynomial evaluation and interpolation can be performed fast over a multidi...
AbstractThis paper examines the most efficient known serial and parallel algorithms for multiplying ...
Consider a sparse polynomial in several variables given explicitly as a sum of non-zero terms with c...
We present a deterministic algorithm for computing all irreducible factors of degree ≤ d of a given ...
In this article, we study the problem of multiplying two multivariate polynomials which are somewhat...
We show that deciding whether a sparse polynomial in one variable has a root in Fp (for p prime) is ...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
AbstractWe present a deterministic algorithm for computing all irreducible factors of degree ⩽d of a...
We obtain new lower bounds on the number of non zeros of sparse polynomials and give a fully polynom...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
AbstractWe elaborate on a correspondence between the coefficients of a multivariate polynomial repre...
In this paper we present various algorithms for multiplying multivariate polynomials and series. All...
AbstractA new algorithm for sparse multivariate polynomial interpolation is presented. It is a multi...
We provide a comprehensive presentation of algorithms, data structures, and implementation technique...
How should one design and implement a program for the multiplication of sparse polynomials? This is ...
AbstractWe observe that polynomial evaluation and interpolation can be performed fast over a multidi...
AbstractThis paper examines the most efficient known serial and parallel algorithms for multiplying ...
Consider a sparse polynomial in several variables given explicitly as a sum of non-zero terms with c...
We present a deterministic algorithm for computing all irreducible factors of degree ≤ d of a given ...
In this article, we study the problem of multiplying two multivariate polynomials which are somewhat...
We show that deciding whether a sparse polynomial in one variable has a root in Fp (for p prime) is ...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
AbstractWe present a deterministic algorithm for computing all irreducible factors of degree ⩽d of a...
We obtain new lower bounds on the number of non zeros of sparse polynomials and give a fully polynom...
The multiplication of polynomials is a fundamental operation in complexity theory. Indeed, for many ...
AbstractWe elaborate on a correspondence between the coefficients of a multivariate polynomial repre...