Strong Subgraph-Count Stability in C2+1-Free Graphs

Abstract

Starting from the stability theorem of Erdős and Simonovits, stability problems for graphs forbidding a fixed subgraph have been studied in terms of edge numbers, spectral radii and subgraph counts. Let N(F,G) denote the number of unlabeled copies of F in G. It is known that, for every fixed path Pt and even cycle C2a, the maximum number of copies in an n-vertex C2+1-free graph is attained by the bipartite Turán graph Tn,2. In this paper we obtain strong structural stability for C2+1-free graphs in terms of copies of paths and even cycles. For fixed 2 and 3 r2-1, we show that if an n-vertex C2+1-free graph contains at least as many copies of Pt or C2a as the corresponding suspended extremal construction, then it has the corresponding suspension structure. This gives exact high-chromatic extremal theorems for paths and even cycles. We also prove a counting theorem for nearly complete bipartite graphs. It shows that, for every fixed matching-admissible connected bipartite graph F, both imbalance between the two parts and missing cross-edges decrease the number of copies of F by a term with a specified main coefficient. This theorem is independent of the forbidden odd cycle and converts subgraph-count assumptions into the edge bounds needed for the structural theorem.

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