Characterisation and classification of signatures of spanning trees of the n-cube

Abstract

The signature of a spanning tree T of the n-cube Qn is the n-tuple sig(T)=(a1,a2,…,an) such that ai is the number of edges of T in the ith direction. We characterise the n-tuples that can occur as the signature of a spanning tree, and classify a signature S as reducible or irreducible according to whether or not there is a proper nonempty subset R of [n] such that restricting S to the indices in R gives a signature of Q|R|. If so, we say moreover that S and T reduce over R. We show that reducibility places strict structural constraints on T. In particular, if T reduces over a set of size r then T decomposes as a sum of 2r spanning trees of Qn-r, together with a spanning tree of a contraction of Qn with underlying simple graph Qr. Moreover, this decomposition is realised by an isomorphism of edge slide graphs, where the edge slide graph of Qn is the graph E(Qn) on the spanning trees of Qn, with an edge between two trees if and only if they are related by an edge slide. An edge slide is an operation on spanning trees of the n-cube given by ``sliding'' an edge of a spanning tree across a 2-dimensional face of the cube to get a second spanning tree. The signature of a spanning tree is invariant under edge slides, so the subgraph E(S) of E(Qn) induced by the trees with signature S is a union of one or more connected components of E(Qn). Reducible signatures may be further divided into strictly reducible and quasi-irreducible signatures, and as an application of our results we show that E(S) is disconnected if S is strictly reducible. We conjecture that the converse is also true.