Tur\'an number and decomposition number of intersecting odd cycles

Abstract

An extremal graph for a given graph H is a graph on n vertices with maximum number of edges that does not contain H as a subgraph. Let s,t be integers and let Hs,t be a graph consisting of s triangles and t cycles of odd lengths at least 5 which intersect in exactly one common vertex. Erdos et al. (1995) determined the extremal graphs for Hs,0. Recently, Hou et al. (2016) determined the extremal graphs for H0,t, where the t cycles have the same odd length q with q 5. In this paper, we further determine the extremal graphs for Hs,t with s 0 and t 1. Let φ(n,H) be the largest integer such that, for all graphs G on n vertices, the edge set E(G) can be partitioned into at most φ(n, H) parts, of which every part either is a single edge or forms a graph isomorphic to H. Pikhurko and Sousa conjectured that φ(n,H)=(n,H) for (H)≥s3 and all sufficiently large n. Liu and Sousa (2015) verified the conjecture for Hs,0. In this paper, we further verify Pikhurko and Sousa's conjecture for Hs,t with s 0 and t 1.