International audienceLet $f(X,Y) \in \ZZ[X,Y]$ be an irreducible polynomial over $\QQ$. We give a Las Vegas absolute irreducibility test based on a property of the Newton polytope of $f$, or more precisely, of $f$ modulo some prime integer $p$. The same idea of choosing a $p$ satisfying some prescribed properties together with $LLL$ is used to provide a new strategy for absolute factorization of $f(X,Y)$. We present our approach in the bivariate case but the techniques extend to the multivariate case. Maple computations show that it is efficient and promising as we are able to factorize some polynomials of degree up to 400
We present a fast parallel deterministic algorithm for testing multivariate integral polynomials for...
AbstractA multivariable polynomial is associated with a polytope, called its Newton polytope. A poly...
International audienceWe improve significantly the Nart-Montes algorithm for factoring polynomials o...
International audienceLet $f(X,Y) \in \ZZ[X,Y]$ be an irreducible polynomial over $\QQ$. We give a L...
AbstractLet f(X,Y)∈Z[X,Y] be an irreducible polynomial over Q. We give a Las Vegas absolute irreduci...
AbstractIn the vein of recent algorithmic advances in polynomial factorization based on lifting and ...
AbstractThis paper presents a new algorithm for the absolute factorization of parametric multivariat...
Cette thèse porte sur les algorithmes de factorisation absolue. Elle débute par un état de l'art (av...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
AbstractWe propose an algorithm for computing an exact absolute factorization of a bivariate polynom...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper gives an algorithm to factor a polynomialf(in one variable) over rings like Z/rZ ...
We present a fast parallel deterministic algorithm for testing multivariate integral polynomials for...
AbstractThis article presents an algorithmic approach to study and compute the absolute factorizatio...
Abstractvan Hoeij’s algorithm for factoring univariate polynomials over the rational integers rests ...
We present a fast parallel deterministic algorithm for testing multivariate integral polynomials for...
AbstractA multivariable polynomial is associated with a polytope, called its Newton polytope. A poly...
International audienceWe improve significantly the Nart-Montes algorithm for factoring polynomials o...
International audienceLet $f(X,Y) \in \ZZ[X,Y]$ be an irreducible polynomial over $\QQ$. We give a L...
AbstractLet f(X,Y)∈Z[X,Y] be an irreducible polynomial over Q. We give a Las Vegas absolute irreduci...
AbstractIn the vein of recent algorithmic advances in polynomial factorization based on lifting and ...
AbstractThis paper presents a new algorithm for the absolute factorization of parametric multivariat...
Cette thèse porte sur les algorithmes de factorisation absolue. Elle débute par un état de l'art (av...
A multivariable polynomial is associated with a polytope, called its Newton polytope. A polynomial i...
AbstractWe propose an algorithm for computing an exact absolute factorization of a bivariate polynom...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper gives an algorithm to factor a polynomialf(in one variable) over rings like Z/rZ ...
We present a fast parallel deterministic algorithm for testing multivariate integral polynomials for...
AbstractThis article presents an algorithmic approach to study and compute the absolute factorizatio...
Abstractvan Hoeij’s algorithm for factoring univariate polynomials over the rational integers rests ...
We present a fast parallel deterministic algorithm for testing multivariate integral polynomials for...
AbstractA multivariable polynomial is associated with a polytope, called its Newton polytope. A poly...
International audienceWe improve significantly the Nart-Montes algorithm for factoring polynomials o...