On the periodicity problem of residual r-Fubini sequences

Abstract

For any positive integer r, the r-Fubini number with parameter n, denoted by Fn,r, is equal to the number of ways that the elements of a set with n+r elements can be weak ordered such that the r least elements are in distinct orders. In this article we focus on the sequence of residues of the r-Fubini numbers modulo a positive integer s and show that this sequence is periodic and then, exhibit how to calculate its period length. As an extra result, an explicit formula for the r-Stirling numbers is obtained which is frequently used in calculations.