Michel Petitot scite author profile

International audienceWe give an algorithm which represents the radical J of a finitely generated differential ideal as an intersection of radical differential ideals. The computed representation provides an algorithm for testing membership in J. This algorithm works over either an ordinary or a partial differential polynomial ring of characteristic zero. It has been programmed. We also give a method to obtain a obtain a characteristic set of J, if the ideal is prime

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Computing representations for radicals of finitely generated differential ideals

Boulier

Lazard

Ollivier

et al. 2009

AAECC

135

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International audienceThis paper deals with systems of polynomial di erential equations, ordinary or with partial derivatives. The embedding theory is the di erential algebra of Ritt and Kolchin. We describe an algorithm, named Rosenfeld-Gröbner, which computes a representation for the radical p of the diff erential ideal generated by any such sys- tem . The computed representation constitutes a normal simpli er for the equivalence relation modulo p (it permits to test embership in p). It permits also to compute Taylor expansions of solutions of . The algorithm is implemented within a package in MAPLE

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On Anisotropic Polynomial Relations for the Elasticity Tensor

Auffray

Kolev

Petitot

2013

J Elast

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La géométrie de l'équation y‴=f(x,y,y′,y″)

Neut

Petitot

2002

Comptes Rendus Mathematique

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Guaranteed solution of direct kinematic problems for general configurations of parallel manipulators

Didrit

Petitot

Walter

1998

IEEE Trans. Robot. Automat.

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Michel Petitot

Representation for the radical of a finitely generated differential ideal

Computing representations for radicals of finitely generated differential ideals

On Anisotropic Polynomial Relations for the Elasticity Tensor

La géométrie de l'équation y‴=f(x,y,y′,y″)

Guaranteed solution of direct kinematic problems for general configurations of parallel manipulators

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