The size of the spanning-tree spectrum of simple graphs
Abstract
For a graph G, let τ(G) denote the number of spanning trees. We show that for every fixed 0 < c < 1/4, the number of distinct values of τ(G), as G ranges over simple graphs on n vertices, is at least (c n n) for all sufficiently large n. This is optimal up to the choice of the constant c and resolves a conjecture of Chan-Kontorovich-Pak regarding a problem of Sedláček from the late 1960s.
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