Finding Planted Cycles in a Random Graph

Abstract

In this paper, we study the problem of finding a collection of planted cycles in an random graph G G(n, λ/n), in analogy to the famous Planted Clique Problem. When the cycles are planted on a uniformly random subset of δn vertices, we show that almost-exact recovery (that is, recovering all but a vanishing fraction of planted-cycle edges as n ∞) is information-theoretically possible if λ< 1(2 δ + 1-δ)2 and impossible if λ> 1(2 δ + 1-δ)2. Moreover, despite the worst-case computational hardness of finding long cycles, we design a polynomial-time algorithm that attains almost exact recovery when λ< 1(2 δ + 1-δ)2. This stands in stark contrast to the Planted Clique Problem, where a significant computational-statistical gap is widely conjectured.