Exact results for some extremal problems on expansions I
Abstract
The expansion of a graph F, denoted by F3, is the 3-graph obtained from F by adding a new vertex to each edge such that different edges receive different vertices. For large n, we establish tight upper bounds for: The maximum number of edges in an n-vertex 3-graph that does not contain T3 for certain class T of trees, sharpening (partially) a result of Kostochka--Mubayi--Verstra\"ete. The minimum number of colors needed to color the complete n-vertex 3-graph to ensure the existence of a rainbow copy of F3 when F is a graph obtained from some tree T∈ T by adding a new edge, extending anti-Ramsey results on P2t3 by Gu--Li--Shi and C2t3 by Tang--Li--Yan. The maximum number of edges in an n-vertex 3-graph whose shadow does not contain the shadow of Ck3 or T3 for T∈ T, answering a question of Lv ηl on generalized Tur\'an problems.
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