Quadrangulations and the Lov\'asz complex

Abstract

The Lov\'asz complex L(G) of a graph G is a deformation retract of its neighborhood complex, equipped with a canonical Z2-action. We show that, under mild assumptions, L(G) is homeomorphic to a surface if and only if G is a non-bipartite quadrangulation of the orbit space L(G)/Z2 in which every 4-cycle is facial. This yields a classification of the Lov\'asz complexes of all such quadrangulations. As an application, we contextualize a result of Archdeacon et al.\ and Mohar and Seymour on the chromatic number of quadrangulations, obtaining a stronger statement about the Z2-index.

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