A combinatorial identity with application to Catalan numbers

Abstract

By a very simple argument, we prove that if l,m,n are nonnegative integers then Σk=0l(-1)m-klkm-kn2kk-2l+m =Σk=0llk2knn-lm+n-3k-l. On the basis of this identity, for d,r=0,1,2,... we construct explicit F(d,r) and G(d,r) such that for any prime p>\d,r\ we have Σk=1p-1kr Ck+d F(d,r)(mod p)& if 3|p-1, \(d,r)\ (mod p)& if 3|p-2, where Cn denotes the Catalan number (n+1)-12nn. For example, when p≥ 5 is a prime, we have Σk=1p-1k2Ck-2/3 (mod p)& if 3|p-1, \1/3 (mod p)& if 3|p-2; and Σ0<k<p-4Ck+4k 503/30 (mod p)& if 3|p-1, -100/3 (mod p)& if 3|p-2. This paper also contains some new recurrence relations for Catalan numbers.

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