GCD of sums of k consecutive squares of generalized Fibonacci numbers

Abstract

In 2021, Guyer and Mbirika gave two equivalent formulas that computed the greatest common divisor (GCD) of all 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 this current paper, we extend their results to the GCD of all sums of k consecutive squares of these numbers. Denoting these GCD values by the symbol GG0, G12\!(k), we prove GG0, G12\!(k) = (Gk Gk+1 - G0 G1,\; Gk+12 - G12,\; Gk+22 - G22). Moreover, we provide very tantalizing closed forms in the specific settings of the Fibonacci, Lucas, and generalized Fibonacci numbers. We close with a number of open questions for further research.