New congruences involving products of two binomial coefficients

Abstract

Let p>3 be a prime and let a be a positive integer. We show that if p1 4 or a>1 then Σk=034pa2kk216k(-1pa)p3 with (-) the Jacobi symbol, which confirms a conjecture of Z.-W. Sun. We also establish the following new congruences: align*Σk=0(p-1)/22kk3kk27k&( p3)2p+13p2, \\Σk=0(p-1)/26k3k3kk(2k+1)432k&( p3)3p+14p2, \\Σk=0(p-1)/24k2k2kk(2k+1)64k&(-1p)2p-1p2. align* Note that in 2003 Rodriguez-Villeguez posed conjectures on Σk=0p-12kk216k,\ Σk=0p-12kk3kk27k,\ Σk=1p-14k2k2kk64k,\ Σk=1p-16k3k3kk432k modulo p2 which were later proved.