Proof of three conjectures on congruences

Abstract

In this paper we prove three conjectures on congruences involving central binomial coefficients or Lucas sequences. Let p be an odd prime and let a be a positive integer. We show that if p 14 or a>1 then Σk=034pa-1/2k(2pa)p2, where (-) denotes the Jacobi symbol. This confirms a conjecture of the second author. We also confirm a conjecture of R. Tauraso by showing that Σk=1p-1Lkk20p provided\ \ p>5, where the Lucas numbers L0,L1,L2,… are defined by L0=2,\ L1=1 and Ln+1=Ln+Ln-1\ (n=1,2,3,…). Our third theorem states that if p=5 then we can determine Fpa-(pa5) mod p3 in the following way: Σk=0pa-1(-1)k2kk(pa5)(1-2Fpa-(pa5))\ p3, which appeared as a conjecture in a paper of Sun and Tauraso in 2010.