About Polynomials Whose Divided Differences are Integer-Valued on Prime Numbers |
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| Authors: | Jean-Luc Chabert |
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| Affiliation: | 1. Département de Mathématiques , Université de Picardie , Amiens , France jean-luc.chabert@u-picardie.fr |
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| Abstract: | We first globalize some recent results about polynomials whose divided differences are integer-valued on subsets of discrete valuation domains. This allows us to describe explicit computations, in particular for polynomials which are integer-valued on the prime numbers. Then, we specialize other recent results about integer-valued polynomials on triangular matrices to matrices whose coefficients are in some subsets, and in particular, when the coefficients are primes. |
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| Keywords: | Divided differences Integer valued polynomials Polynomial closure Prime numbers Regular subsets Triangular matrices |
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