The Random Tur\'an Problem for Theta Graphs

Abstract

Given a graph F, we define ex(Gn,p,F) to be the maximum number of edges in an F-free subgraph of the random graph Gn,p. Very little is known about ex(Gn,p,F) when F is bipartite, with essentially tight bounds known only when F is either C4, C6, C10, or Ks,t with t sufficiently large in terms of s, due to work of F\"uredi and of Morris and Saxton. We extend this work by establishing essentially tight bounds when F is a theta graph with sufficiently many paths. Our main innovation is in proving a balanced supersaturation result for vertices, which differs from the standard approach of proving balanced supersaturation for edges.