Jennifer Biermann, Selvi Kara, Augustine O'Keefe, Joseph Skelton, Gabriel Sosa Castillo
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In this paper, we investigate the degree of $h$-polynomials of edge ideals of
finite simple graphs. In particular, we provide combinatorial formulas for the
degree of the $h$-polynomial for various fundamental classes of graphs such as
paths, cycles, and bipartite graphs. To the best of our knowledge, this marks
the first investigation into the combinatorial interpretation of this algebraic
invariant. Additionally, we characterize all connected graphs in which the sum
of the Castelnuovo-Mumford regularity and the degree of the $h$-polynomial of
an edge ideal reaches its maximum value, which is the number of vertices in the
graph.
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