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Paper detail

Faces of Directed Edge Polytopes

Given a finite quiver (directed graph) without loops and multiedges, the convex hull of the column vector of the incidence matrix is called the directed edge polytope and is an interesting example of lattice polytopes. In this paper, we give a complete characterization of facets of the directed edge polytope of an arbitrary finite quiver without loops and multiedges in terms of the connectivity and the existence of a rank function. Our result can be regarded as an extension of the result of Higashitani et al. on facets of symmetric edge polytopes to directed edge polytopes. When the quiver in question has a rank function, we obtain a characterization of faces of arbitrary dimensions.

preprint2022arXivOpen access
Yasuhide NumataYusuke TakahashiDai Tamaki
math.CO
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Yasuhide NumataYusuke TakahashiDai Tamaki

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