Rainbow Tur\'an problems for a matching and any other graph
Abstract
For a family of graphs , a graph is called -free if it does not contain any member of as a subgraph. Given a collection of graphs (G1,…,Gt) on the same vertex set V of size n, a rainbow graph on V is obtained by taking at most one edge from each Gi. We say that a collection is rainbow -free if it contains no rainbow copy of any member of . In this paper, we study the maximum values of mini∈ [t]|E(Gi)|, Σi=1t|E(Gi)| and Πi=1t|E(Gi)| among rainbow \F,Ms+1\-free collections (G1,…,Gt) on n vertices.
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