The Gessel Correspondence and the Partial $γ$-Positivity of the Eulerian Polynomials on Multiset Stirling Permutations

Abstract: Pondering upon the grammatical labeling of 0-1-2 increasing plane trees, we came to the realization that the grammatical labels play a role as records of chopped off leaves of the original increasing binary trees. While such an understanding is purely psychological, it does give rise to an efficient apparatus to tackle the partial γ-positivity of the Eulearian polynomials on multiset Stirling permutations, as long as we bear in mind the combinatorial meanings of the labels x and y in the Gessel representation … Show more

“…The bivariate polynomials A 0 (x, y) = y can be expressed in terms of the numbers of descents and ascents of permutations, or in terms of complete increasing binary trees, which are called the Gessel trees in [6].…”

The Dumont Ansatz for the Eulerian Polynomials, Peak Polynomials and Derivative Polynomials

“…The bivariate polynomials A 0 (x, y) = y can be expressed in terms of the numbers of descents and ascents of permutations, or in terms of complete increasing binary trees, which are called the Gessel trees in [6].…”

The Dumont Ansatz for the Eulerian Polynomials, Peak Polynomials and Derivative Polynomials