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Main Authors: Martínez, Luis, López, Antonio Vera, Pérez, Antonio Vera, Pérez, Beatriz Vera, Basova, Olga
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2402.12926
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author Martínez, Luis
López, Antonio Vera
Pérez, Antonio Vera
Pérez, Beatriz Vera
Basova, Olga
author_facet Martínez, Luis
López, Antonio Vera
Pérez, Antonio Vera
Pérez, Beatriz Vera
Basova, Olga
contents We revisit the concepts of acyclic orderings and number of acyclic orderings of acyclic digraphs in terms of dispositions and counters for arbitrary multidigraphs. We prove that when we add a sequence of nested directed paths to a directed graph there is a unique polynomial such that the generatrix function of the family of counters is the product of the polynomial and the exponential function. We give an application, by considering a kind of digraphs arranged in rows introduced by the authors in a previous paper, called dispositional digraphs, in the particular case in which the digraph has two rows, to obtain new families of linear differential equations of small order whose coefficients are polynomials of small degree which admit polynomial solutions. In particular, we obtain a new differential equation associated to Catalan numbers, and the corresponding associated polynomials, which are solution of this differential equation; we term them Catalan differencial equation and Catalan polynomials, respectively. We prove that the Catalan polynomials obtained when we connect the directed path to the second vertex of the lower row of the digraph are orthogonal polynomials for an appropriate weight function. We characterize the digraphs that maximize the counter of connected dispositional digraphs and we find a new differential equation associated to these digraphs. We introduce also dispositions and counters in any multidigraph with non-strict inequalities in the dispositions, and we find new differential equations associated to some of them.
format Preprint
id arxiv_https___arxiv_org_abs_2402_12926
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Generalized tableaux over arbitrary digraphs and their associated differential equations
Martínez, Luis
López, Antonio Vera
Pérez, Antonio Vera
Pérez, Beatriz Vera
Basova, Olga
Combinatorics
We revisit the concepts of acyclic orderings and number of acyclic orderings of acyclic digraphs in terms of dispositions and counters for arbitrary multidigraphs. We prove that when we add a sequence of nested directed paths to a directed graph there is a unique polynomial such that the generatrix function of the family of counters is the product of the polynomial and the exponential function. We give an application, by considering a kind of digraphs arranged in rows introduced by the authors in a previous paper, called dispositional digraphs, in the particular case in which the digraph has two rows, to obtain new families of linear differential equations of small order whose coefficients are polynomials of small degree which admit polynomial solutions. In particular, we obtain a new differential equation associated to Catalan numbers, and the corresponding associated polynomials, which are solution of this differential equation; we term them Catalan differencial equation and Catalan polynomials, respectively. We prove that the Catalan polynomials obtained when we connect the directed path to the second vertex of the lower row of the digraph are orthogonal polynomials for an appropriate weight function. We characterize the digraphs that maximize the counter of connected dispositional digraphs and we find a new differential equation associated to these digraphs. We introduce also dispositions and counters in any multidigraph with non-strict inequalities in the dispositions, and we find new differential equations associated to some of them.
title Generalized tableaux over arbitrary digraphs and their associated differential equations
topic Combinatorics
url https://arxiv.org/abs/2402.12926