• DocumentCode
    2270037
  • Title

    A Delaunay Simplification Algorithm for Vector Fields

  • Author

    Dey, Tamal K. ; Levine, Joshua A. ; Wenger, Rephael

  • Author_Institution
    Ohio State Univ., Columbus
  • fYear
    2007
  • fDate
    Oct. 29 2007-Nov. 2 2007
  • Firstpage
    281
  • Lastpage
    290
  • Abstract
    We present a Delaunay based algorithm for simplifying vector field datasets. Our aim is to reduce the size of the mesh on which the vector field is defined while preserving topological features of the original vector field. We leverage a simple paradigm, vertex deletion in Delaunay triangulations, to achieve this goal. This technique is effective for two reasons. First, we guide deletions by a local error metric that bounds the change of the vectors at the affected simplices and maintains regions near critical points to prevent topological changes. Second, piecewise-linear interpolation over Delaunay triangulations is known to give good approximations of scalar fields. Since a vector field can be regarded as a collection of component scalar fields, a Delaunay triangulation can preserve each component and thus the structure of the vector field as a whole. We provide experimental evidence showing the effectiveness of our technique and its ability to preserve features of both two and three dimensional vector fields.
  • Keywords
    approximation theory; computational geometry; interpolation; mesh generation; piecewise linear techniques; Delaunay simplification algorithm; component scalar field approximation; mesh size reduction; piecewise-linear interpolation; vector field dataset; vertex deletion; Application software; Approximation error; Computer graphics; Computer science; Data engineering; Interpolation; Piecewise linear techniques; Power system modeling; Sampling methods; Topology;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Computer Graphics and Applications, 2007. PG '07. 15th Pacific Conference on
  • Conference_Location
    Maui, HI
  • ISSN
    1550-4085
  • Print_ISBN
    978-0-7695-3009-3
  • Type

    conf

  • DOI
    10.1109/PG.2007.34
  • Filename
    4392738