On two conjectural supercongruences of Z.-W. Sun

Abstract

In this paper, we mainly prove two conjectural supercongruences of Sun by using the following identity Σk=0n2kk22n-2kn-k2=16nΣk=0nn+kknk2kk2(-16)k which arises from a 4F3 hypergeometric transformation. For any prime p>3, we prove that gather* Σn=0p-1n+18nΣk=0n2kk22n-2kn-k2(-1)(p-1)/2p+5p3Ep-3p4,\\ Σn=0p-12n+1(-16)nΣk=0n2kk22n-2kn-k2(-1)(p-1)/2p+3p3Ep-3p4, gather* where Ep-3 is the (p-3)th Euler number.