Counting lattice points that appear as algebraic invariants of Cameron-Walker graphs
Abstract
In 2021, Hibi et. al. studied lattice points in N2 that appear as ( R/I, R/I) when I is the edge ideal of a graph on n vertices, and showed these points lie between two convex polytopes. When restricting to the class of Cameron--Walker graphs, they showed that these pairs do not form a convex lattice polytope. In this paper, for the edge ideal I of a Cameron--Walker graph on n vertices, we find how many points in N2 appear as ((R/I),(R/I)), and how many points in N4 appear as ((R/I),(R/I),(R/I),(R/I)).
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