Fibonacci and Lucas numbers arising from two-component spanning forests of wheel graphs

Abstract

In this paper, we present a constructive bijection between a conditioned spanning forest of the wheel graph Wn+1 and a spanning tree of the fan graph Fn. In addition, by applying the effective resistance formula obtained by Bapat and Gupta bapat-gupta, we derive an explicit formula for the number of two-component spanning forests of Wn+1 in which two specified vertices u and v lie in distinct components. Based on this result, we obtain explicit formulas for the following three conditioned two-component spanning forests FWn+1(v1 v2), FWn+1(v1 v3), and FWn+1(v1 vc). These formulas are FWn+1(v1 v2)=2(f2n-1-1), FWn+1(v1 v3)=2(2n-2-3), FWn+1(v1 vc)=f2n, where fi and j denote the i-th Fibonacci number and j-th Lucas number, respectively. As these identities show, the enumerations naturally lead to formulas involving Fibonacci numbers and Lucas numbers. Taken together, these two approaches show a unified perspective. One is the constructive combinatorial bijection, and the other is the analytic method based on effective resistance. Together they provide a new integrated framework for studying the structure of spanning forests on Wn+1.

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