Congruences involving generalized central trinomial coefficients

Abstract

For integers b and c the generalized central trinomial coefficient Tn(b,c) denotes the coefficient of xn in the expansion of (x2+bx+c)n. Those Tn=Tn(1,1)\ (n=0,1,2,…) are the usual central trinomial coefficients, and Tn(3,2) coincides with the Delannoy number Dn=Σk=0n nkn+kk in combinatorics. We investigate congruences involving generalized central trinomial coefficients systematically. Here are some typical results: For each n=1,2,3,… we have Σk=0n-1(2k+1)Tk(b,c)2(b2-4c)n-1-k0n2 and in particular n2Σk=0n-1(2k+1)Dk2; if p is an odd prime then Σk=0p-1Tk2(-1p)\ p\ \ \ and\ \ \ Σk=0p-1Dk2( 2p)\ p, where (-) denotes the Legendre symbol. We also raise several conjectures some of which involve parameters in the representations of primes by certain binary quadratic forms.