Supercongruences involving dual sequences

Abstract

In this paper we study some sophisticated supercongruences involving dual sequences. For n=0,1,2,… define dn(x)=Σk=0n nk xk2k and sn(x)=Σk=0n nk xkx+kk=Σk=0n nk(-1)k xk-1-xk. For any odd prime p and p-adic integer x, we determine Σk=0p-1(1)kdk(x)2 and Σk=0p-1(2k+1)dk(x)2 modulo p2; for example, we establish the new p-adic congruence Σk=0p-1(-1)kdk(x)2(-1) xpp2, where xp denotes the least nonnegative integer r with x r p. For any prime p>3 and p-adic integer x, we determine Σk=0p-1sk(x)2 modulo p2 (or p3 if x∈\0,…,p-1\), and show that Σk=0p-1(2k+1)sk(x)20p2. We also pose several related conjectures.