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Auteurs principaux: Gonzalez, Michael, Orellana, Rosa, Tomba, Mario
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2404.06002
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author Gonzalez, Michael
Orellana, Rosa
Tomba, Mario
author_facet Gonzalez, Michael
Orellana, Rosa
Tomba, Mario
contents We study Stanley's chromatic symmetric function (CSF) for trees when expressed in the star-basis. We use the deletion-near-contraction algorithm recently introduced in \cite{ADOZ} to compute coefficients that occur in the CSF in the star-basis. In particular, one of our main results determines the smallest partition in lexicographic order that occurs as an indexing partition in the CSF, and we also give a formula for its coefficient. In addition to describing properties of trees encoded in the coefficients of the star-basis, we give two main applications of the leading coefficient result. The first is a strengthening of the result in \cite{ADOZ} that says that proper trees of diameter less than or equal to 5 can be reconstructed from their CSFs. In this paper we show that this is true for all trees of diameter less than or equal 5. In our second application, we show that the dimension of the subspace of symmetric functions spanned by the CSF of $n$-vertex trees is $p(n)-n+1$, where $p(n)$ is the number of partitions of $n$.
format Preprint
id arxiv_https___arxiv_org_abs_2404_06002
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The chromatic symmetric function in the star-basis
Gonzalez, Michael
Orellana, Rosa
Tomba, Mario
Combinatorics
05E0, 05C60
We study Stanley's chromatic symmetric function (CSF) for trees when expressed in the star-basis. We use the deletion-near-contraction algorithm recently introduced in \cite{ADOZ} to compute coefficients that occur in the CSF in the star-basis. In particular, one of our main results determines the smallest partition in lexicographic order that occurs as an indexing partition in the CSF, and we also give a formula for its coefficient. In addition to describing properties of trees encoded in the coefficients of the star-basis, we give two main applications of the leading coefficient result. The first is a strengthening of the result in \cite{ADOZ} that says that proper trees of diameter less than or equal to 5 can be reconstructed from their CSFs. In this paper we show that this is true for all trees of diameter less than or equal 5. In our second application, we show that the dimension of the subspace of symmetric functions spanned by the CSF of $n$-vertex trees is $p(n)-n+1$, where $p(n)$ is the number of partitions of $n$.
title The chromatic symmetric function in the star-basis
topic Combinatorics
05E0, 05C60
url https://arxiv.org/abs/2404.06002