New constructions of Meyniel extremal families of graphs
DOI:
https://doi.org/10.55016/yyry5x69Abstract
We provide new constructions of Meyniel extremal graphs, which are families of graphs with the conjectured largest asymptotic cop number. Using spanning subgraphs, we prove that there are an exponential number of new Meyniel extremal families with specified degrees. Using linear programming on hypergraphs, we explore the degrees in families that are not Meyniel extremal. We give the best-known upper bound on the cop number of vertex-transitive graphs with a prescribed degree. We find new Meyniel extremal families of regular graphs with large chromatic number, large diameter, and explore the connection between Meyniel extremal graphs and bipartite graphs. Conjectures relating Meyniel extremal families to maximum and average degrees in their graphs are presented.Downloads
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Copyright (c) 2026 Anthony Bonato, Ryan Cushman, Trent G. Marbach
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