On extremal problems on multigraphs

TL;DR

This paper investigates extremal multigraph problems, focusing on the maximum product of edge multiplicities for specific parameters, partially resolving an open conjecture and revealing conditions under which the conjecture fails.

Contribution

It addresses a specific case of a conjecture on extremal multigraphs, providing partial solutions and identifying size constraints for the conjecture's validity.

Findings

Confirmed the conjecture for large n in the specific case

Disproved the conjecture for n=6, showing size constraints matter

Extended understanding of extremal properties in multigraphs

Abstract

An $(n,s,q)$-graph is an $n$-vertex multigraph in which every $s$-set of vertices spans at most $q$ edges. Erd\H{o}s initiated the study of maximum number of edges of $(n,s,q)$-graphs, and the extremal problem on multigraphs has been considered since the 1990s. The problem of determining the maximum product of the edge multiplicities in $(n,s,q)$-graphs was posed by Mubayi and Terry in 2019. Recently, Day, Falgas-Ravry and Treglown settled a conjecture of Mubayi and Terry on the case $(s,q)=(4, 6a + 3)$ of the problem (for $a \ge 2$), and they gave a general lower bound construction for the extremal problem for many pairs $(s, q)$, which they conjectured is asymptotically best possible. Their conjecture was confirmed exactly or asymptotically for some specific cases. In this paper, we consider the case that $(s,q)=(5,\binom{5}{2}a+4)$ and $d=2$ of their conjecture, partially solve an open problem raised by Day, Falgas-Ravry and Treglown. We also show that the conjecture fails for $n=6$, which indicates for the case that $(s,q)=(5,\binom{5}{2}a+4)$ and $d=2$, $n$ needs to be sufficiently large for the conjecture to hold.