Some congruences related to the q-Fermat quotients

Abstract

We give q-analogues of the following congruences by Z.-W. Sun: Σk=1p-1Dkk -2p-1-1p p,\\ Σk=1p-1Hkk 2k 0 p, p≥slant 5, where p is a prime, Dn=Σk=0nn+k 2k2k k are the Delannoy numbers, and Hn=Σk=1n1k are the harmonic numbers. We also prove that, for any positive integer m and prime p>m+1, Σ1≤slant k1≤slant ·s ≤slant km≤slant p-11k1·s km 2km 12Σk=1p-1(-1)k-1km p, which is a multiple generalization of Kohnen's congruence. Furthermore, a q-analogue of this congruence is established.