Separating hyperplanes of edge polytopes
Abstract
Let G be a finite connected simple graph with d vertices and let G ⊂ d be the edge polytope of G. We call G decomposable if G decomposes into integral polytopes G+ and G- via a hyperplane. In this paper, we explore various aspects of decomposition of G: we give an algorithm deciding the decomposability of G, we prove that G is normal if and only if both G+ and G- are normal, and we also study how a condition on the toric ideal of G (namely, the ideal being generated by quadratic binomials) behaves under decomposition.
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