Luck and magic for Pitman-Stanley polytopes and parking functions
Abstract
Motivated by the combinatorics of parking functions and their several generalizations, we study the Ehrhart theory of Pitman--Stanley polytopes. We prove a strong positivity phenomenon called magic positivity for the Ehrhart polynomials of these polytopes, which in turn implies that their h*-polynomials are real-rooted (and thus log-concave and unimodal). Our result is achieved by interpreting the coefficients of these Ehrhart polynomials in the magic basis in terms of the number of lucky cars in a modified parking protocol. Furthermore, we address the magic positivity problem for y-generalized permutohedra and also discuss a magic combinatorial interpretation for them, under the assumption that the input parameters are sufficiently large.
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