Fibonacci numbers modulo cubes of primes

Abstract

Let p be an odd prime. It is well known that Fp-( p5) 0p, where \Fn\n0 is the Fibonacci sequence and (-) is the Jacobi symbol. In this paper we show that if p=5 then we may determine Fp-( p5) mod p3 in the following way: Σk=0(p-1)/22kk(-16)k(p5)(1+Fp-( p5)2)p3. We also use Lucas quotients to determine Σk=0(p-1)/22kk/mk modulo p2 for any integer m0p; in particular, we obtain Σk=0(p-1)/22kk16k(3p)p2. In addition, we pose three conjectures for further research.