Sharp precision in hensel lifting for bivariate polynomial factorization

Grégoire Lecerf

doi:10.1090/S0025-5718-06-01810-2

Sharp precision in hensel lifting for bivariate polynomial factorization

Grégoire Lecerf

Laboratoire de Mathématiques de Versailles

Résultats de recherche: Contribution à un journal › Article › Revue par des pairs

Résumé

Popularized by Zassenhaus in the seventies, several algorithms for factoring polynomials use a so-called lifting and recombination scheme. Concerning bivariate polynomials, we present a new algorithm for the recombination stage that requires a lifting up to precision twice the total degree of the polynomial to be factored. Its cost is dominated by the computation of reduced echelon solution bases of linear systems. We show that our bound on precision is asymptotically optimal.

langue originale	Anglais
Pages (de - à)	921-933
Nombre de pages	13
journal	Mathematics of Computation
Volume	75
Numéro de publication	254
Les DOIs	https://doi.org/10.1090/S0025-5718-06-01810-2
état	Publié - 1 janv. 2006
Modification externe	Oui

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10.1090/S0025-5718-06-01810-2

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title = "Sharp precision in hensel lifting for bivariate polynomial factorization",

abstract = "Popularized by Zassenhaus in the seventies, several algorithms for factoring polynomials use a so-called lifting and recombination scheme. Concerning bivariate polynomials, we present a new algorithm for the recombination stage that requires a lifting up to precision twice the total degree of the polynomial to be factored. Its cost is dominated by the computation of reduced echelon solution bases of linear systems. We show that our bound on precision is asymptotically optimal.",

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AB - Popularized by Zassenhaus in the seventies, several algorithms for factoring polynomials use a so-called lifting and recombination scheme. Concerning bivariate polynomials, we present a new algorithm for the recombination stage that requires a lifting up to precision twice the total degree of the polynomial to be factored. Its cost is dominated by the computation of reduced echelon solution bases of linear systems. We show that our bound on precision is asymptotically optimal.

KW - Hensel lifting

KW - Polynomial factorization

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U2 - 10.1090/S0025-5718-06-01810-2

DO - 10.1090/S0025-5718-06-01810-2

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Sharp precision in hensel lifting for bivariate polynomial factorization

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