On multipartite posets

Geir Agnarsson

arXiv:0706.1529·math.CO·June 12, 2007·Discret. Math.·1 cites

On multipartite posets

Geir Agnarsson

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TL;DR

This paper establishes a precise asymptotic upper bound on the order dimension of m-partite posets, linking it to their bipartite sub-posets, using a constructive and elementary approach.

Contribution

It provides a tight asymptotic upper bound on the order dimension of m-partite posets based on their bipartite sub-posets, with a constructive proof.

Findings

01

Derived a tight asymptotic upper bound for order dimension

02

Connected order dimension to bipartite sub-posets

03

Presented a constructive and elementary proof

Abstract

A poset $P = (X, ⪯)$ is {\em $m$ -partite} if $X$ has a partition $X = X_{1} \cup ... \cup X_{m}$ such that (1) each $X_{i}$ forms an antichain in $P$ , and (2) $x ≺ y$ implies $x \in X_{i}$ and $y \in X_{j}$ where $i < j$ . In this article we derive a tight asymptotic upper bound on the order dimension of $m$ -partite posets in terms of $m$ and their bipartite sub-posets in a constructive and elementary way.

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Taxonomy

TopicsLimits and Structures in Graph Theory · Algebraic Geometry and Number Theory · Advanced Combinatorial Mathematics