Resonance graphs that are daisy cubes: from hypercubes to independent sets via resonant sets

Abstract

Let G be a plane elementary bipartite graph whose infinite face is forcing. We provide a bijection between the set of maximal hypercubes of its resonance graph and the set of maximal resonant sets of G, which generalizes a main result in [MATCH Commun. Math. Comput. Chem. 68 (2012) 65-77], where G was only considered as an elementary benzenoid graph without nice coronenes. For a special case when G is a peripherally 2-colorable graph, it follows that there is a bijection between the set of maximal hypercubes of its resonance graph and the set of maximal independent sets of a tree that is the inner dual of G. We then show that the resonance graph of a plane bipartite graph G is a daisy cube if and only if it is the simplex graph of the complement of a forest. Finally, we characterize trees with at most 5 maximal independent sets to determine daisy cubes that are simplex graphs of the complements of trees and having at most five maximal vertices.

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