New congruences for sums involving Apery numbers or central Delannoy numbers

Abstract

The Ap\'ery numbers An and central Delannoy numbers Dn are defined by An=Σk=0nn+k 2k22k k2, Dn=Σk=0nn+k 2k2k k. Motivated by some recent work of Z.-W. Sun, we prove the following congruences: Σk=0n-1(2k+1)2r+1Ak & Σk=0n-1k (2k+1)2r+1Dk 0 n, where n≥slant 1, r≥slant 0, and =1. For r=1, we further show that Σk=0n-1(2k+1)3Ak & 0n3, Σk=0p-1(2k+1)3Ak & p3 2p6, where p>3 is a prime. The following congruence Σk=0n-1 n+k k2n-1 k2 0 n plays an important role in our proof.