Totally nonnegative matrices, chain enumeration and zeros of polynomials

Autor: Brändén, Petter, Leite, Leonardo Saud Maia
Rok vydání: 2024
Předmět:
Druh dokumentu: Working Paper
Popis: We prove that any lower triangular and totally nonnegative matrix whose diagonal entries are all equal to one gives rise to a family real-rooted polynomials. This is used to develop a general theory for proving that chain polynomials of rank uniform posets are real-rooted. The results obtained extend and unify results of the first author, Brenti, Welker and Athanasiadis. In the process we define a notion of $h$-vectors for a large class of posets which generalize the $h$-vectors commonly associated to simplicial and cubical complexes. This answers a question of Alder on defining a $h$-vectors for $q$-posets. A consequence of our methods is a characterization of the convex hull of all characteristic polynomials of hyperplane arrangements of fixed dimension and over a fixed finite field. This may be seen as a refinement of the critical problem of Crapo and Rota. We also use the methods developed to answer an open problem posed by Forg\'acs and Tran on the real-rootedness of polynomials arising from certain bivariate rational functions.
Databáze: arXiv