Extremal graphs for the odd prism

Abstract

The Tur\'an number ex(n,H) of a graph H is the maximum number of edges in an n-vertex graph which does not contain H as a subgraph. The Tur\'an number of regular polyhedrons was widely studied in a series of works due to Simonovits. In this paper, we shall present the exact Tur\'an number of the prism C2k+1 , which is defined as the Cartesian product of an odd cycle C2k+1 and an edge K2 . Applying a deep theorem of Simonovits and a stability result of Yuan [European J. Combin. 104 (2022)], we shall determine the exact value of ex(n,C2k+1) for every k 1 and sufficiently large n, and we also characterize the extremal graphs. Moreover, in the case of k=1, motivated by a recent result of Xiao, Katona, Xiao and Zamora [Discrete Appl. Math. 307 (2022)], we will determine the exact value of ex(n,C3 ) for every n instead of for sufficiently large n.