On rainbow Tur\'an Densities of Trees

Abstract

For a given collection G = (G1,…, Gk) of graphs on a common vertex set V, which we call a graph system, a graph H on a vertex set V(H) ⊂eq V is called a rainbow subgraph of G if there exists an injective function :E(H) → [k] such that e ∈ G(e) for each e∈ E(H). The maximum value of i\|E(Gi)|\ over n-vertex graph systems G having no rainbow subgraph isomorphic to H is called the rainbow Tur\'an number exk(n, H) of H. In this article, we study the rainbow Tur\'an density πk(T) = n → ∞ exk(n, T)n2 of a tree T. While the classical Tur\'an density π(H) of a graph H lies in the set \1-1t : t∈ N\, the rainbow Tur\'an density exhibits different behaviors as it can even be an irrational number. Nevertheless, we conjecture that the rainbow Tur\'an density is always an algebraic number. We provide evidence for this conjecture by proving that the rainbow Tur\'an density of a tree is an algebraic number. To show this, we identify the structure of extremal graphs for rainbow trees. Moreover, we further determine all tuples (α1,…, αk) such that every graph system (G1,…,Gk) satisfying |E(Gi)|>(αi+o(1))n2 contains all rainbow k-edge trees. In the course of proving these results, we also develop the theory on the limit of graph systems.

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