The spanning tree spectrum: improved bounds and simple proofs

Abstract

The number of spanning trees of a graph G, denoted τ(G), is a well studied graph parameter with numerous connections to other areas of mathematics. In a recent remarkable paper, answering a question of Sedl\'acek from 1969, Chan, Kontorovich and Pak showed that τ(G) takes at least 1.1103n different values across simple (and planar) n-vertex graphs G, for large enough n. We give a very short, purely combinatorial proof that at least 1.55n values are attained. We also prove that exponential growth can be achieved with regular graphs, determining the growth rate in another problem first raised by Sedl\'acek in the late 1960's. We further show that the following modular dual version of the result holds. For any integer N and any u < N there exists a planar graph on O( N) vertices whose number of spanning trees is u modulo N.

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