Some Congruences Involving Fourth Powers of Generalized Central Trinomial Coefficients
Abstract
Let p 5 be a prime and let b, c ∈ Z . Denote by Tk(b,c) the generalized central trinomial coefficient, i.e., the coefficient of xk in (x2 + bx + c)k . In this paper, we establish congruences modulo p3 and p4 for sums of the form Σk=0p-1 (2k+1)2a+1\,k\,Tk(b,c)4d2k, where a ∈ 0,1 , ∈ \1,-1\ , and d = b2 - 4c satisfies p d . In particular, for the special case b = c = 1 , we show that align* Σk=0p-1( 2k+1) 3 Tk49k -3p4+3p24( qp(3)4-1) p3, align* where Tk is the central trinomial coefficient and qp(a) is the Fermat quotient.
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