Congruences concerning Legendre polynomials III

Abstract

Let p>3 be a prime, and let Rp be the set of rational numbers whose denominator is coprime to p. Let \Pn(x)\ be the Legendre polynomials. In this paper we mainly show that for m,n,t∈ Rp with m 0 p, &P[ p6](t) -( 3p)Σx=0p-1(x3-3x+2tp) p, &(Σx=0p-1(x3+mx+np))2 (-3mp) Σk=0[p/6]2kk3kk6k3k (4m3+27n2123· 4m3)k p, where ( ap) is the Legendre symbol and [x] is the greatest integer function. As an application we solve some conjectures of Z.W. Sun and the author concerning Σk=0p-12kk3kk6k3k/mk p2, where m is an integer not divisible by p.