Paths of Length Three are Kr+1-Tur\'an Good
Abstract
The generalized Tur\'an problem ext(n,T,F) is to determine the maximal number of copies of a graph T that can exist in an F-free graph on n vertices. Recently, Gerbner and Palmer noted that the solution to the generalized Tur\'an problem is often the original Tur\'an graph. They gave the name "F-Tur\'an-good" to graphs T for which, for large enough n, the solution to the generalized Tur\'an problem is realized by a Tur\'an graph. They prove that the path graph on two edges, P2, is Kr+1-Tur\'an-good for all r 3, but they conjecture that the same result should hold for all P. In this paper, using arguments based in flag algebras, we prove that the path on three edges, P3, is also Kr+1-Tur\'an-good for all r 3.
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