Nested cycles with no geometric crossings

Abstract

In 1975, Erdos asked the following question: what is the smallest function f(n) for which all graphs with n vertices and f(n) edges contain two edge-disjoint cycles C1 and C2, such that the vertex set of C2 is a subset of the vertex set of C1 and their cyclic orderings of the vertices respect each other? We prove the optimal linear bound f(n)=O(n) using sublinear expanders.