Connected Tur\'{a}n numbers for Berge paths in hypergraphs

TL;DR

This paper investigates the maximum number of edges in large connected hypergraphs avoiding Berge paths of certain lengths, providing exact and asymptotic results for specific cases.

Contribution

It extends previous work by precisely determining the connected Turán numbers for Berge paths when path length is at most the uniformity, and asymptotically for length equal to uniformity plus one.

Findings

Exact values for large n not divisible by r when k ≤ r.

Asymptotic determination for k = r+1.

Builds on prior bounds for large k and n.

Abstract

Let $\mathcal{F}$ be a family of $r$-uniform hypergraphs. Denote by $\ex^{\mathrm{conn}}_r(n,\mathcal{F})$ the maximum number of hyperedges in an $n$-vertex connected $r$-uniform hypergraph which contains no member of $\mathcal{F}$ as a subhypergraph. Denote by $\mathcal{B}C_k$ the Berge cycle of length $k$, and by $\mathcal{B}P_k$ the Berge path of length $k$. F\"{u}redi, Kostochka and Luo, and independently Gy\H{o}ri, Salia and Zamora determined $\ex^{\mathrm{conn}}_r(n,\mathcal{B}P_k)$ provided $k$ is large enough compared to $r$ and $n$ is sufficiently large. For the case $k\le r$, Kostochka and Luo obtained an upper bound for $\ex^{\mathrm{conn}}_r(n,\mathcal{B}P_k)$. In this paper, we continue investigating the case $k\le r$. We precisely determine $\ex^{\mathrm{conn}}_r(n,\mathcal{B}P_k)$ when $n$ is sufficiently large and $n$ is not a multiple of~$r$. For the case $k=r+1$, we determine $\ex^{\mathrm{conn}}_r(n,\mathcal{B}P_k)$ asymptotically.