A Lower Bound on Cycle-Finding in Sparse Digraphs

Abstract

We consider the problem of finding a cycle in a sparse directed graph G that is promised to be far from acyclic, meaning that the smallest feedback arc set in G is large. We prove an information-theoretic lower bound, showing that for N-vertex graphs with constant outdegree any algorithm for this problem must make (N5/9) queries to an adjacency list representation of G. In the language of property testing, our result is an (N5/9) lower bound on the query complexity of one-sided algorithms for testing whether sparse digraphs with constant outdegree are far from acyclic. This is the first improvement on the (N) lower bound, implicit in Bender and Ron, which follows from a simple birthday paradox argument.