Almost Unimodal and Real-Rooted Graph Polynomials
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Publication:6359435
DOI10.1016/J.EJC.2022.103637arXiv2102.00268MaRDI QIDQ6359435
Vsevolod Rakita, J. A. Makowsky
Publication date: 30 January 2021
Abstract: It is well known that the coefficients of the matching polynomial are unimodal. Unimodality of the coefficients (or their absolute values) of other graph polynomials have been studied as well. One way to prove unimodality is to prove real-rootedness.` Recently I. Beaton and J. Brown (2020) proved the for almost all graphs the coefficients of the domination polynomial form a unimodal sequence, and C. Barton, J. Brown and D. Pike (2020) proved that the forest polynomial (aka acyclic polynomial) is real-rooted iff is a forest. Let be a graph property, and let be the number of induced subgraphs of order of a graph which are in . Inspired by their results we prove: {�f Theorem:} If is the complement of a hereditary property, then for almost all graphs in the sequence is unimodal. {�f Theorem:} If is a hereditary property which contains a graph which is not a clique or the complement of a clique, then the graph polynomial is real-rooted iff .
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