Polynomial extension of Fleck's congruence

Abstract

Let p be a prime, and let f(x) be an integer-valued polynomial. By a combinatorial approach, we obtain a nontrivial lower bound of the p-adic order of the sum Σk=r(mod pβ)nk(-1)k f([(k-r)/pα]), where αβ 0, n pα-1 and r∈ Z. This polynomial extension of Fleck's congruence has various backgrounds and several consequences such as Σk=r(mod pα)nk ak 0 (mod p[(n-pα-1)/φ(pα)]) provided that α>1 and a-1(mod p).

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