Supercongruences via Beukers' method

Abstract

Recently, using modular forms F. Beukers posed a unified method that can deal with a large number of supercongruences involving binomial coefficients and Ap\'ery-like numbers. In this paper, we use Beukers' method to prove some conjectures of the first author concerning the congruences for Σk=0(p-1)/22kk3mk, \ Σk=0p-12kk24k2kmk, \ Σk=0p-12kk3kk6k3kmk, \ Σn=0p-1Vnmn,\ Σn=0p-1Tnmn,\ Σn=0p-1Dnmn and Σn=0p-1(-1)nAn modulo p3, where p is an odd prime representable by some suitable binary quadratic form, m is an integer not divisible by p, Vn=Σk=0n2kk22n-2kn-k2, Tn=Σk=0n nk22kn2, Dn=Σk=0n nk22kk2n-2kn-k and An is the Ap\'ery number given by An=Σk=0n nk2n+kk2.