The Zarankiewicz problem in 3-partite graphs

TL;DR

This paper extends the Zarankiewicz problem to 3-partite graphs, establishing upper bounds for extremal functions, demonstrating their asymptotic tightness in specific cases, and exploring connections with design theory.

Contribution

It provides a new upper bound for the maximum edges in 3-partite graphs avoiding certain complete bipartite subgraphs, and shows this bound is tight for specific parameters, also linking to design theory.

Findings

Established an analogue of the K"{o}vári-Sós-Turán theorem for 3-partite graphs.

Proved the upper bound is asymptotically tight for certain bipartite graphs with odd t.

Connected difference families from design theory to extremal problems involving C4.

Abstract

Let $F$ be a graph, $k \geq 2$ be an integer, and write $\mathrm{ex}_{ \chi \leq k } (n , F)$ for the maximum number of edges in an $n$-vertex graph that is $k$-partite and has no subgraph isomorphic to $F$. The function $\mathrm{ex}_{ \chi \leq 2} ( n , F)$ has been studied by many researchers. Finding $\mathrm{ex}_{ \chi \leq 2} (n , K_{s,t})$ is a special case of the Zarankiewicz problem. We prove an analogue of the K\"{o}v\'{a}ri-S\'{o}s-Tur\'{a}n Theorem for 3-partite graphs by showing \[ \mathrm{ex}_{ \chi \leq 3} (n , K_{s,t} ) \leq \left( \frac{1}{3} \right)^{1 - 1/s} \left( \frac{ t - 1}{2} + o(1) \right)^{1/s} n^{2 - 1/s} \] for $2 \leq s \leq t$. Using Sidon sets constructed by Bose and Chowla, we prove that this upper bound is asymptotically best possible in the case that $s = 2$ and $t \geq 3$ is odd, i.e., $\mathrm{ex}_{ \chi \leq 3} ( n , K_{2,2t+1} ) = \sqrt{ \frac{t}{3}} n^{3/2} + o(n^{3/2})$ for $t \geq 1$. In the cases of $K_{2,t}$ and $K_{3,3}$, we use a result of Allen, Keevash, Sudakov, and Verstra\"{e}te, to show that a similar upper bound holds for all $k \geq 3$, and gives a better constant when $s=t=3$. Lastly, we point out an interesting connection between difference families from design theory and $\mathrm{ex}_{ \chi \leq 3 } (n ,C_4)$.