Cullen and Woodall numbers in Padovan and Perrin sequences

Abstract

Let \Pn\n 0 and \Rn\n 0 denote the Padovan and Perrin sequences, both satisfying the recurrence Un+3 = Un+1 + Un, but with initial values P0 = P1 = P2 = 1 and R0 = 3, R1 = 0, R2 = 2, respectively. A Cullen number is a positive integer of the form m· 2m + 1 for some integer m 1, while a Woodall number is a positive integer of the form m· 2m - 1 for some integer m 1. In this paper, we determine all Woodall numbers in the Padovan sequence and all Cullen numbers in the Perrin sequence. Specifically, we prove that 1 and 7 are the only Woodall numbers in the Padovan sequence, and that 3 is the only Cullen number in the Perrin sequence.