Affiliation:
1. Institutionen för Matematik, KTH Royal Institute of Technology, Stockholm, Sweden
Abstract
Abstract
In algebraic, topological, and geometric combinatorics, inequalities among the coefficients of combinatorial polynomials are frequently studied. Recently, a notion called the alternatingly increasing property, which is stronger than unimodality, was introduced. In this paper, we relate the alternatingly increasing property to real-rootedness of the symmetric decomposition of a polynomial to develop a systematic approach for proving the alternatingly increasing property for several classes of polynomials. We apply our results to strengthen and generalize real-rootedness, unimodality, and alternatingly increasing results pertaining to colored Eulerian and derangement polynomials, Ehrhart $h^\ast$-polynomials for lattice zonotopes, $h$-polynomials of barycentric subdivisions of doubly Cohen–Macaulay level simplicial complexes, and certain local $h$-polynomials for subdivisions of simplices. In particular, we prove two conjectures of Athanasiadis.
Funder
Knut and Alice Wallenberg Foundation, and
Vetenskapsrådet
United States National Science Foundation Mathematical Sciences Postdoctoral Research Fellowship
Publisher
Oxford University Press (OUP)
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