On the Power of Unambiguity in Logspace

Abstract

We report progress on the vs problem. [-] We show unconditionally that the complexity class ⊂eq. This improves on the earlier known upper bound ⊂eq . [-] We investigate the complexity of min-uniqueness - a central notion in studying the vs problem. We show that min-uniqueness is necessary and sufficient for showing =. We revisit the class [ n] and show that ShortestPathLength - computing the length of the shortest path in a DAG, is complete for [ n]. We introduce [ n], an unambiguous version of [ n], and show that (a) = if and only if [ n] = [ n], (b) ≤ [ n] ≤ . [-] We show that the reachability problem over graphs embedded on 3 pages is complete for . This contrasts with the reachability problem over graphs embedded on 2 pages which is logspace equivalent to the reachability problem in planar graphs and hence is in .