Graphs With the Same Edge Count in Each Neighborhood

Abstract

In a recent paper, Caro, Lauri, Mifsud, Yuster, and Zarb ask which parameters r and c admit the existence of an r-regular graph such that the neighborhood of each vertex induces exactly c edges. They show that every r with c satisfying 0≤ c≤ r 2-5r3/2 is achievable, but no r with c satisfying r 2-r3≤ c≤ r 2-1 is. We strengthen the bound in their nonexistence result from r 2-r3 to r 2-r-22. Additionally, when the graph is the Cayley graph of an abelian group, we obtain a much more fine-grained characterization of the achievable values of c between r2 - 5r3/2 and r2 - r-22, which we conjecture to be the correct answer for general graphs as well. That result relies on a lemma about approximate subgroups in the "99% regime," quantifying the extent to which nearly-additively-closed subsets of an abelian group must be close to actual subgroups. Finally, we consider a generalization to graphs with multiple types of edges and partially resolve several open questions of Caro et al. about flip colorings of graphs.