1. A COMBINATORIAL MODEL FOR COMPUTING VOLUMES OF FLOW POLYTOPES.
- Author
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BENEDETTI, CAROLINA, GONZÁLEZ D’LEÓN, RAFAEL S., HANUSA, CHRISTOPHER R. H., HARRIS, PAMELA E., KHARE, APOORVA, MORALES, ALEJANDRO H., and YIP, MARTHA
- Subjects
POLYTOPES ,CATALAN numbers ,FLOWGRAPHS ,HERMITE polynomials ,PARTITION functions ,TRIANGLES ,WASTE products - Abstract
We introduce new families of combinatorial objects whose enumeration computes volumes of flow polytopes. These objects provide an interpretation, based on parking functions, of Baldoni and Vergne’s generalization of a volume formula originally due to Lidskii. We recover known flow polytope volume formulas and prove new volume formulas for flow polytopes. A highlight of our model is an elegant formula for the flow polytope of a graph we call the caracol graph. As by-products of our work, we uncover a new triangle of numbers that interpolates between Catalan numbers and the number of parking functions, we prove the log-concavity of rows of this triangle along with other sequences derived from volume computations, and we introduce a new Ehrhart-like polynomial for flow polytope volume and conjecture product formulas for the polytopes we consider. [ABSTRACT FROM AUTHOR]
- Published
- 2019
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