Supercongruences involving binomial coefficients and Euler polynomials

Abstract

Let p be an odd prime and let x be a p-adic integer. In this paper, we establish supercongruences for Σk=0p-1xkx+kk(-4)k(dk+1)2kkp2 and Σk=0p-1xkx+kk(-2)k(dk+1)2kkp2, where d∈\0,1,2\. As consequences, we extend some known results. For example, for p>3 we show Σk=0p-13kk(427)k19+89p+427pEp-2(13)p2, where En(x) denotes the Euler polynomial of degree n. This generalizes a known congruence of Z.-W. Sun.

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