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Main Authors: Green, Radford, Holmes, Cornell, Im, Mee Seong
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.16255
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author Green, Radford
Holmes, Cornell
Im, Mee Seong
author_facet Green, Radford
Holmes, Cornell
Im, Mee Seong
contents The study of spanning trees and related structures is central in graph theory, closely connected to understanding functions between finite sets. This paper generalizes the established relationship between rooted trees and eventually constant endomorphisms to a wider context including $k$-tuples of functions among $k$ disjoint vertex sets. We derive a weighted count of eventually constant $k$-tuples, which are characterized by their stabilization to constancy upon iterated composition. This construction is the set-theoretic analogue of the nilpotent cone and offers new insight into the combinatorial structure of cyclic digraphs. By identifying these $k$-tuples with their induced digraphs, we construct explicit formulas for their generating polynomials and analyze the cardinality of the set of eventually constant $k$-tuples. These polynomials are multisymmetric in $k$ sets of variables and can be re-expressed as the character of a representation of the product of general linear groups. We extend the ideas to the more general structures of eventually $N$-cyclic and $λ$-cyclic $k$-tuples, which we define and provide similar theorems for their generating functions and cardinality.
format Preprint
id arxiv_https___arxiv_org_abs_2604_16255
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Multisymmetric functions on eventually constant cyclic graphs
Green, Radford
Holmes, Cornell
Im, Mee Seong
Combinatorics
Representation Theory
Primary: 05C20, 05C62, 05E05, 05C31, Secondary: 05C10, 22E27
The study of spanning trees and related structures is central in graph theory, closely connected to understanding functions between finite sets. This paper generalizes the established relationship between rooted trees and eventually constant endomorphisms to a wider context including $k$-tuples of functions among $k$ disjoint vertex sets. We derive a weighted count of eventually constant $k$-tuples, which are characterized by their stabilization to constancy upon iterated composition. This construction is the set-theoretic analogue of the nilpotent cone and offers new insight into the combinatorial structure of cyclic digraphs. By identifying these $k$-tuples with their induced digraphs, we construct explicit formulas for their generating polynomials and analyze the cardinality of the set of eventually constant $k$-tuples. These polynomials are multisymmetric in $k$ sets of variables and can be re-expressed as the character of a representation of the product of general linear groups. We extend the ideas to the more general structures of eventually $N$-cyclic and $λ$-cyclic $k$-tuples, which we define and provide similar theorems for their generating functions and cardinality.
title Multisymmetric functions on eventually constant cyclic graphs
topic Combinatorics
Representation Theory
Primary: 05C20, 05C62, 05E05, 05C31, Secondary: 05C10, 22E27
url https://arxiv.org/abs/2604.16255