Bipartite Tur\'an number of trees

TL;DR

This paper systematically investigates bipartite Turán numbers for trees, establishing bounds, solving specific cases, and addressing open problems in bipartite extremal graph theory.

Contribution

It introduces new bounds for bipartite Turán numbers related to trees and solves several specific cases, including all trees up to six vertices.

Findings

Derived bounds for bipartite Turán numbers based on maximum degree and class sizes.

Solved bipartite Turán problems for all trees up to six vertices.

Provided answers to open problems on bipartite Turán numbers for tree families.

Abstract

We start a systematic investigation concerning bipartite Tur\'an number for trees. For a graph $F$ and integers $1 \leq a \leq b$ we define: $(i)$\quad $ex_b(a, b, F)$ is the largest number of edges that an $F$-free bipartite graph can have with part sizes $a$ and $b$. We write $ex_b(n, F)$ for $ex_b(n, n, F)$. $(ii)$\quad $ex_{b,c}(a, b, F)$ is the largest number of edges that an $F$-free connected, bipartite graph can have with part sizes $a$ and $b$. We write $ex_{b,c}(n, F)$ for $ex{b,c}(n, n, F)$. Both definitions are similar for a family $\mathcal{F}$ of graphs. We prove general lower bounds depending on the maximum degree of $F$, as well as on the cardinalities of the two vertex classes of $F$. We derive upper and lower bounds for $ex_b(n,F)$ in terms of $ex(2n,F)$ and $ex(n, F)$, the corresponding classical (not bipartite) Tur\'an numbers. We solve both problems for various classes of graphs, including all trees up to six vertices for any $n$, for double stars $D_{s ,t}$ if $a \geq f(s,t )$, for some families of spiders, and more. We use these results to supply an answer to a problem raised by L. T. Yuan and X. D. Zhang [{\it Graphs and Combinatorics}, 2017] concerning $ex_b( n, \mathcal{T}_{k,\ell} )$, where $\mathcal{T}_{k,\ell}$ is the family of all trees with vertex classes of respective cardinalities $k$ and $\ell$. The asymptotic worst-case ratios between Tur\'an-type functions are also inverstigated.