Some Results on k-Tur\'an-good Graphs

Abstract

For a graph H and a k-chromatic graph F, if the Tur\'an graph Tk-1(n) has the maximum number of copies of H among all n-vertex F-free graphs (for n large enough), then H is called F-Tur\'an-good, or k-Tur\'an-good for short if F is Kk. In this paper, we construct some new classes of k-Tur\'an-good graphs and prove that P4 and P5 are k-Tur\'an-good for k4.