Weighted Turan Problems with Applications

Suppose the edges of $K_n$ are assigned weights by a weight function $w$. We define the {\em weighted extremal number} \[ \mathrm{ex}(n,w,F):=\max\{w(G)\mid G\subseteq K_n,\text{ and }G\text{ is }F\text{-free}\} \] where $w(G):=\sum_{e\in E(G)}w(e)$. In this paper we study this problem for two types...

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Hauptverfasser:	Bennett, Patrick, English, Sean, Talanda-Fisher, Maria
Format:	Artikel
Sprache:	eng
Schlagworte:	Mathematics - Combinatorics
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Zusammenfassung:	Suppose the edges of $K_n$ are assigned weights by a weight function $w$. We define the {\em weighted extremal number} \[ \mathrm{ex}(n,w,F):=\max\{w(G)\mid G\subseteq K_n,\text{ and }G\text{ is }F\text{-free}\} \] where $w(G):=\sum_{e\in E(G)}w(e)$. In this paper we study this problem for two types of weights $w$, each of which has an application. The first application is to an extremal problem in a complete multipartite host graph. The second application is to the maximum rectilinear crossing number of trees of diameter 4.
DOI:	10.48550/arxiv.1809.05028