On the Graphical r-Stirling Numbers of the First Kind for Specific Graph Families

Abstract

This paper investigates the graphical r-Stirling numbers of the first kind, denoted by Gk, which enumerate partitions of a vertex set V(G) into k disjoint cycles such that r specified vertices occupy distinct blocks. We establish closed-form expressions and recursive identities for fundamental graph families, including Path (Pn), Cycle (Cn), Star (Sn), Wheel (Wn), and Fan (Fn) graphs. A primary focus of this study is the statistical characterization of the cycle distribution. We derive explicit formulas for the mean and variance of these numbers, extracted from the structural properties of the r-cycle polynomials. These results provide a rigorous measure of the average cycle density and variability across different graph topologies, bridging the gap between algebraic combinatorics and the structural analysis of restricted permutations.