Triangulating the Square: Quadtrees and Delaunay Triangulations are Equivalent

Maarten Löffler, Wolfgang Mulzer

    Research output: Chapter in Book/Report/Conference proceedingConference contributionAcademicpeer-review

    Abstract

    We show that Delaunay triangulations and compressed quadtrees are equivalent structures. More precisely, we give two algorithms: the first computes a compressed quadtree for a planar point set, given the Delaunay triangulation; the second finds the Delaunay triangulation, given a compressed quadtree. Both algorithms run in deterministic linear time on a pointer machine. Our work builds on and extends previous results by Krznaric and Levcopolous and Buchin and Mulzer. Our main tool for the second algorithm is the well-separated pair decomposition (WSPD), a structure that has been used previously to find Euclidean minimum spanning trees in higher dimensions. We show that knowing the WSPD (and a quadtree) suffices to compute a planar EMST in linear time. With the EMST at hand, we can find the Delaunay triangulation in linear time. As a corollary, we obtain deterministic versions of many previous algorithms related to Delaunay triangulations, such as splitting planar Delaunay triangulations, preprocessing imprecise points for faster Delaunay computation, and transdichotomous Delaunay triangulations.
    Original languageEnglish
    Title of host publicationProc. 22nd Symposium on Discrete Algorithms
    Pages1759-1777
    Number of pages19
    Publication statusPublished - 2011

    Keywords

    • CG, QT, DT

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