UNLIKELY INTERSECTIONS AND MULTIPLE ROOTS OF SPARSE POLYNOMIALS
Résumé
We present a structure theorem for the multiple non-cyclotomic irre-ducible factors appearing in the family of all univariate polynomials with a given set of coefficients and varying exponents. Roughly speaking, this result shows that the multiple non-cyclotomic irreducible factors of a sparse polynomial, are also sparse. To prove this, we give a variant of a theorem of Bombieri and Zannier on the intersection of a fixed subvariety of codimension 2 of the multiplicative group with all the torsion curves, with bounds having an explicit dependence on the height of the subvariety. We also use this latter result to give some evidence on a conjecture of Bolognesi and Pirola.
Domaines
Théorie des nombres [math.NT]
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MultipleRoots_2015-07-18 (1).pdf (488.56 Ko)
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MultipleRoots_2015-07-18.pdf (488.56 Ko)
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Origine : Fichiers produits par l'(les) auteur(s)
Origine : Fichiers produits par l'(les) auteur(s)
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