The 𝑄-spectrum and spanning trees of tensor products of bipartite graphs

Chow, Timothy

doi:10.1090/S0002-9939-97-04049-5

The $Q$-spectrum and spanning trees of tensor products of bipartite graphs
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by Timothy Y. Chow PDF

Proc. Amer. Math. Soc. 125 (1997), 3155-3161 Request permission

Abstract:

Recently, Knuth and Ciucu independently proved the surprising fact, conjectured by Stanley, that one connected component of the tensor product of a path with itself (the so-called “Aztec diamond graph”) has four times as many spanning trees as the other connected component, independent of the length of the path. We show here that much more is true: the connected components of the tensor product of any connected bipartite multigraphs all have essentially the same $Q$-spectrum. It follows at once that there is a simple formula relating their numbers of spanning trees.

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