Supercongruences involving products of two binomial coefficients
Abstract
In this paper we deduce some new supercongruences modulo powers of a prime p>3. Let d∈\0,1,…,(p-1)/2\. We show that Σk=0(p-1)/22kk2kk+d8k 0\ (mod\ p)\ \ \ if\ d p+12\ (mod\ 2), and Σk=0(p-1)/22kk2kk+d16k (-1p)+p2(-1)d4Ep-3(d+12)p3, where Ep-3(x) denotes the Euler polynomial of degree p-3, and (-) stands for the Legendre symbol. The paper also contains some other results such as Σk=0p-1k(1+(-1p))/26k3k3kk864k0p2.
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