A note on toric ideals of graphs and Knutson-Miller-Yong decompositions
Abstract
We use a Gr\"obner basis technique first introduced by Knutson, Miller and Yong to study the interplay between properties of a graph G and algebraic properties of the toric ideal that it defines. We first recover a well-known height formula for the toric ideal of a graph IG and demonstrate an algebraic property that can detect when a graph deletion is bipartite. We also bound the chromatic number (G) using information about an initial ideal of IG.
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