AbstractWe present new deterministic and probabilistic algorithms that reduce the factorization of dense polynomials from several variables to one variable. The deterministic algorithm runs in sub-quadratic time in the dense size of the input polynomial, and the probabilistic algorithm is softly optimal when the number of variables is at least three. We also investigate the reduction from several to two variables and improve the quantitative version of Bertini’s irreducibility theorem
In this paper, we present a new algorithm for reducing a multivariate polynomial with respect to an ...
We present the first efficient deterministic algorithm for factoring sparse polynomials that split i...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper presents a probabilistic reduction for factoring polynomials from multivariate to...
AbstractIn the vein of recent algorithmic advances in polynomial factorization based on lifting and ...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper presents a probabilistic reduction for factoring polynomials from multivariate to...
AbstractWe propose a new lifting and recombination scheme for rational bivariate polynomial factoriz...
We present a sequential deterministic polynomial-time algorithm for testing dense multivariate polyn...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
International audienceIn this article we present a new algorithm for reducing the usual sparse bivar...
International audienceIn this article we present a new algorithm for reducing the usual sparse bivar...
AbstractWe present a deterministic algorithm for computing all irreducible factors of degree ⩽d of a...
Abstract We introduce a new approach to multivariate polynomial factorisation which incorporates ide...
We present a deterministic algorithm for computing all irreducible factors of degree ≤ d of a given ...
In this paper, we present a new algorithm for reducing a multivariate polynomial with respect to an ...
We present the first efficient deterministic algorithm for factoring sparse polynomials that split i...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper presents a probabilistic reduction for factoring polynomials from multivariate to...
AbstractIn the vein of recent algorithmic advances in polynomial factorization based on lifting and ...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
AbstractThis paper presents a probabilistic reduction for factoring polynomials from multivariate to...
AbstractWe propose a new lifting and recombination scheme for rational bivariate polynomial factoriz...
We present a sequential deterministic polynomial-time algorithm for testing dense multivariate polyn...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
International audienceIn this article we present a new algorithm for reducing the usual sparse bivar...
International audienceIn this article we present a new algorithm for reducing the usual sparse bivar...
AbstractWe present a deterministic algorithm for computing all irreducible factors of degree ⩽d of a...
Abstract We introduce a new approach to multivariate polynomial factorisation which incorporates ide...
We present a deterministic algorithm for computing all irreducible factors of degree ≤ d of a given ...
In this paper, we present a new algorithm for reducing a multivariate polynomial with respect to an ...
We present the first efficient deterministic algorithm for factoring sparse polynomials that split i...
AbstractThis paper deals with the problem of computing the degrees and multiplicities of the irreduc...
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