Binomial coefficients, Catalan numbers and Lucas quotients

Abstract

Let p be an odd prime and let a,m be integers with a>0 and m 0 p. In this paper we determine Σk=0pa-12kk+d/mk mod p2 for d=0,1; for example, Σk=0pa-12kkmk(m2-4mpa)+(m2-4mpa-1)up-(m2-4mp)p2, where (-) is the Jacobi symbol, and \un\n≥slant0 is the Lucas sequence given by u0=0, u1=1 and un+1=(m-2)un-un-1 for n=1,2,3,…. As an application, we determine Σ0<k<pa,\, k rp-1Ck modulo p2 for any integer r, where Ck denotes the Catalan number 2kk/(k+1). We also pose some related conjectures.