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1. Verfasser: Zhu, Bao-Xuan
Format: Preprint
Veröffentlicht: 2022
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Online-Zugang:https://arxiv.org/abs/2202.03793
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author Zhu, Bao-Xuan
author_facet Zhu, Bao-Xuan
contents Total positivity of matrices is deeply studied and plays an important role in various branches of mathematics. The aim of this paper is to study the criteria for coefficientwise Hankel-total positivity of the row-generating polynomials of generalized $m$-Jacobi-Rogers triangles and their applications. Using the theory of production matrices, we present the criteria for coefficientwise Hankel-total positivity of the row-generating polynomials of the output matrices of certain production matrices. In particular, we gain a criterion for coefficientwise Hankel-total positivity of the row-generating polynomial sequence of the generalized $m$-Jacobi-Rogers triangle. This immediately implies that the corresponding generalized $m$-Jacobi-Rogers triangular convolution preserves the Stieltjes moment property of sequences and its zeroth column sequence is coefficientwise Hankel-totally positive and log-convex of higher order in all the indeterminates. In consequence, for $m=1$, we immediately obtain some results on Hankel-total positivity for the Catalan-Stieltjes matrices. In particular, we in a unified manner apply our results to some combinatorial triangles or polynomials including the generalized Jacobi Stirling triangle, a generalized elliptic polynomial, a refined Stirling cycle polynomial and a refined Eulerian polynomial. For the general $m$, combining our criterion and a function satisfying an autonomous differential equation, we present different criteria for coefficientwise Hankel-total positivity of the row-generating polynomial sequence of exponential Rirodan arrays. In addition, we also derive some results for coefficientwise Hankel-total positivity in terms of compositional functions and $m$-branched Stieltjes-type continued fractions. We apply our results to many combinatorial polynomials and solve some conjcetures proposed by Sokal.
format Preprint
id arxiv_https___arxiv_org_abs_2202_03793
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Coefficientwise Hankel-total positivity of the row-generating polynomials for the output matrices of certain production matrices
Zhu, Bao-Xuan
Combinatorics
Classical Analysis and ODEs
Total positivity of matrices is deeply studied and plays an important role in various branches of mathematics. The aim of this paper is to study the criteria for coefficientwise Hankel-total positivity of the row-generating polynomials of generalized $m$-Jacobi-Rogers triangles and their applications. Using the theory of production matrices, we present the criteria for coefficientwise Hankel-total positivity of the row-generating polynomials of the output matrices of certain production matrices. In particular, we gain a criterion for coefficientwise Hankel-total positivity of the row-generating polynomial sequence of the generalized $m$-Jacobi-Rogers triangle. This immediately implies that the corresponding generalized $m$-Jacobi-Rogers triangular convolution preserves the Stieltjes moment property of sequences and its zeroth column sequence is coefficientwise Hankel-totally positive and log-convex of higher order in all the indeterminates. In consequence, for $m=1$, we immediately obtain some results on Hankel-total positivity for the Catalan-Stieltjes matrices. In particular, we in a unified manner apply our results to some combinatorial triangles or polynomials including the generalized Jacobi Stirling triangle, a generalized elliptic polynomial, a refined Stirling cycle polynomial and a refined Eulerian polynomial. For the general $m$, combining our criterion and a function satisfying an autonomous differential equation, we present different criteria for coefficientwise Hankel-total positivity of the row-generating polynomial sequence of exponential Rirodan arrays. In addition, we also derive some results for coefficientwise Hankel-total positivity in terms of compositional functions and $m$-branched Stieltjes-type continued fractions. We apply our results to many combinatorial polynomials and solve some conjcetures proposed by Sokal.
title Coefficientwise Hankel-total positivity of the row-generating polynomials for the output matrices of certain production matrices
topic Combinatorics
Classical Analysis and ODEs
url https://arxiv.org/abs/2202.03793