On congruences related to central binomial coefficients

Abstract

It is known that Σk=0∞2kk/((2k+1)4k)=π/2 and Σk=0∞2kk/((2k+1)16k)=π/3. In this paper we obtain their p-adic analogues such as Σp/2<k<p2kk/((2k+1)4k)=3Σp/2<k<p2kk/((2k+1)16k)= pEp-3 (mod p2), where p>3 is a prime and E0,E1,E2,... are Euler numbers. Besides these, we also deduce some other congruences related to central binomial coefficients. In addition, we pose some conjectures one of which states that for any odd prime p we have Σk=0p-12kk3=4x2-2p (mod p2) if (p/7)=1 and p=x2+7y2 with x,y integers, and Σk=0p-12kk3=0 (mod p2) if (p/7)=-1, i.e., p=3,5,6 (mod 7).