GCD of sums of k consecutive Fibonacci, Lucas, and generalized Fibonacci numbers

Abstract

We explore the sums of k consecutive terms in the generalized Fibonacci sequence (Gn)n ≥ 0 given by the recurrence Gn = Gn-1 + Gn-2 for all n ≥ 2 with integral initial conditions G0 and G1. In particular, we give precise values for the greatest common divisor (GCD) of all sums of k consecutive terms of (Gn)n ≥ 0. When G0 = 0 and G1 = 1, we yield the GCD of all sums of k consecutive Fibonacci numbers, and when G0 = 2 and G1 = 1, we yield the GCD of all sums of k consecutive Lucas numbers. Denoting the GCD of all sums of k consecutive generalized Fibonacci numbers by the symbol GG0, G1\!(k), we give two tantalizing characterizations for these values, one involving a simple formula in k and another involving generalized Pisano periods: GG0, G1\!(k) = (Gk+1-G1,\, Gk+2-G2)\; and GG0, G1\!(k) = lcm\m πG0,G1\!(m) divides k\, where πG0,G1\!(m) denotes the generalized Pisano period of the generalized Fibonacci sequence modulo m. The fact that these vastly different-looking formulas coincide leads to some surprising and delightful new understandings of the Fibonacci and Lucas numbers.