A Proof of the Alternate Thomass\'e Conjecture for Countable $NE$-Free Posets

A Proof of the Alternate Thomass\'e Conjecture for Countable $NE$-Free Posets

An $N$-free poset is a poset whose comparability graph does not embed an induced path with four vertices. We use the well-quasi-order property of the class of countable $N$-free posets and some labelled ordered trees to show that a countable $N$-free poset has one or infinitely many siblings, up to...

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1. Verfasser: Abdi, Davoud
Format: Artikel
Sprache:eng
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Mathematics - Combinatorics
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Zusammenfassung:An $N$-free poset is a poset whose comparability graph does not embed an induced path with four vertices. We use the well-quasi-order property of the class of countable $N$-free posets and some labelled ordered trees to show that a countable $N$-free poset has one or infinitely many siblings, up to isomorphism. This, partially proves a conjecture stated by Thomass\'e for this class.
DOI:10.48550/arxiv.2209.03893