The number of bounded-degree spanning trees

Abstract

For a graph G, let ck(G) be the number of spanning trees of G with maximum degree at most k. For k 3, it is proved that every connected n-vertex r-regular graph G with r nk+1 satisfies ck(G)1/n (1-on(1)) r · zk where zk > 0 approaches 1 extremely fast (e.g. z10=0.999971). The minimum degree requirement is essentially tight as for every k 2 there are connected n-vertex r-regular graphs G with r= n/(k+1) -2 for which ck(G)=0. Regularity may be relaxed, replacing r with the geometric mean of the degree sequence and replacing zk with zk* > 0 that also approaches 1, as long as the maximum degree is at most n(1-(3+ok(1)) k/k). The same holds with no restriction on the maximum degree as long as the minimum degree is at least nk(1+ok(1)).

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