Network Realignment Complexes over General Graphs

Abstract

Network realignment complexes were introduced by Kozlov. We generalise their definition to arbitrary connected base graphs. For a connected graph G, we characterise the connected components of the associated network realignment complex XG and show that XG admits an Aut(G)-equivariant strong deformation retraction onto the disjoint union of a complete graph and a discrete Aut(G)-space. For the complete base graph Kn, we study the metric structure of the network realignment graph Gn and obtain explicit upper and lower bounds for its diameter. Finally, we prove that Xn is a cubical flag complex and that every automorphism of Xn is induced by a relabelling of the underlying vertex set. In particular, Aut(Xn) Sn for all n≥ 5.

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