Better Tradeoffs for Exact Distance Oracles in Planar Graphs

Abstract

We present an O(n1.5)-space distance oracle for directed planar graphs that answers distance queries in O( n) time. Our oracle both significantly simplifies and significantly improves the recent oracle of Cohen-Addad, Dahlgaard and Wulff-Nilsen [FOCS 2017], which uses O(n5/3)-space and answers queries in O( n) time. We achieve this by designing an elegant and efficient point location data structure for Voronoi diagrams on planar graphs. We further show a smooth tradeoff between space and query-time. For any S∈ [n,n2], we show an oracle of size S that answers queries in O(\1,n1.5/S\) time. This new tradeoff is currently the best (up to polylogarithmic factors) for the entire range of S and improves by polynomial factors over all the previously known tradeoffs for the range S ∈ [n,n5/3].