Graph Saturation in Multipartite Graphs

TL;DR

This paper determines the minimum size of K_3-saturated subgraphs in complete balanced k-partite graphs for large n, and provides constructions for K_t-saturated subgraphs, contrasting with existing edge-density results.

Contribution

It explicitly computes saturation numbers for triangles in multipartite graphs and introduces new constructions for larger cliques, advancing understanding of saturation in multipartite settings.

Findings

Determined $ ext{sat}(K_3,K_k^n)$ for $k extgreater 3$ and large $n$.

Provided constructions of $K_t$-saturated subgraphs for $t extgreater 3$.

Contrasted saturation results with existing density-based extremal graph results.

Abstract

Let $G$ be a fixed graph and let ${\mathcal F}$ be a family of graphs. A subgraph $J$ of $G$ is ${\mathcal F}$-saturated if no member of ${\mathcal F}$ is a subgraph of $J$, but for any edge $e$ in $E(G)-E(J)$, some element of ${\mathcal F}$ is a subgraph of $J+e$. We let $\text{ex}({\mathcal F},G)$ and $\text{sat}({\mathcal F},G)$ denote the maximum and minimum size of an ${\mathcal F}$-saturated subgraph of $G$, respectively. If no element of ${\mathcal F}$ is a subgraph of $G$, then $\text{sat}({\mathcal F},G) = \text{ex}({\mathcal F}, G) = |E(G)|$. In this paper, for $k\ge 3$ and $n\ge 100$ we determine $\text{sat}(K_3,K_k^n)$, where $K_k^n$ is the complete balanced $k$-partite graph with partite sets of size $n$. We also give several families of constructions of $K_t$-saturated subgraphs of $K_k^n$ for $t\ge 4$. Our results and constructions provide an informative contrast to recent results on the edge-density version of $\text{ex}(K_t,K_k^n)$ from [A. Bondy, J. Shen, S. Thomass\'e, and C. Thomassen, Density conditions for triangles in multipartite graphs, Combinatorica 26 (2006), 121--131] and [F. Pfender, Complete subgraphs in multipartite graphs, Combinatorica 32 (2012), no. 4, 483--495].