On asymptotic values for the minimum number of spanning forests in simple regular graphs
Abstract
Let F(G) be the number of spanning forests in a graph G and C(n,d) be the set of all connected d-regular simple graphs of order n. Define fd=n→ ∞\F(G)1/n:G∈ C(n,d)\. Let ni be the number of vertices of degree i in G. In this paper we give two lower bounds for F(G) in terms of ni in connected graphs whose vertex degrees belong to \2,3\ and \2,3,4\, respectively. Furthermore, we determine the exact values of f3 and f4.
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