International audienceWe present a probabilistic Las Vegas algorithm for solving sufficiently generic square polynomial systems over finite fields. We achieve a nearly quadratic running time in the number of solutions, for densely represented input polynomials. We also prove a nearly linear bit complexity bound for polynomial systems with rational coefficients. Our results are obtained using the combination of the Kronecker solver and a new improved algorithm for fast multivariate modular composition
This paper is about solving polynomial systems. It first recalls how to do that efficiently with a v...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
International audienceA fundamental problem in computer science is to find all the common zeroes of ...
International audienceWe present a probabilistic Las Vegas algorithm for solving sufficiently generi...
We propose new Las Vegas randomized algorithms for the solution of a multivariate generic or sparse ...
Analysis of condition number for random matrices originated in the works of von Neumann and Turing o...
Given a system of polynomial equations and inequations with coefficients in the field of rational nu...
AbstractGiven a system of polynomial equations and inequations with coefficients in the field of rat...
International audienceA new Las Vegas algorithm is presented for the composition of two polynomials ...
We describe and analyze a randomized algorithm which solves a polynomial system over the rationals d...
International audienceThe best known asymptotic bit complexity bound for factoring univariate polyno...
We consider the problem of finding solutions to systems of polynomial equations over a finite field....
Given a zero-dimensional polynomial system consisting of n integer polynomials in n variables, we pr...
International audienceLet $f, f_1, \ldots, f_\nV$ be polynomials with rational coefficients in the i...
In recent years a number of algorithms have been designed for the "inverse" computational ...
This paper is about solving polynomial systems. It first recalls how to do that efficiently with a v...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
International audienceA fundamental problem in computer science is to find all the common zeroes of ...
International audienceWe present a probabilistic Las Vegas algorithm for solving sufficiently generi...
We propose new Las Vegas randomized algorithms for the solution of a multivariate generic or sparse ...
Analysis of condition number for random matrices originated in the works of von Neumann and Turing o...
Given a system of polynomial equations and inequations with coefficients in the field of rational nu...
AbstractGiven a system of polynomial equations and inequations with coefficients in the field of rat...
International audienceA new Las Vegas algorithm is presented for the composition of two polynomials ...
We describe and analyze a randomized algorithm which solves a polynomial system over the rationals d...
International audienceThe best known asymptotic bit complexity bound for factoring univariate polyno...
We consider the problem of finding solutions to systems of polynomial equations over a finite field....
Given a zero-dimensional polynomial system consisting of n integer polynomials in n variables, we pr...
International audienceLet $f, f_1, \ldots, f_\nV$ be polynomials with rational coefficients in the i...
In recent years a number of algorithms have been designed for the "inverse" computational ...
This paper is about solving polynomial systems. It first recalls how to do that efficiently with a v...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
International audienceA fundamental problem in computer science is to find all the common zeroes of ...