• Title of article

    Geometry-aware bases for shape approximation

  • Author/Authors

    Sorkine، نويسنده , , O.، نويسنده , , Cohen-Or، نويسنده , , D.، نويسنده , , Irony، نويسنده , , D.، نويسنده , , Toledo، نويسنده , , S.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2005
  • Pages
    10
  • From page
    171
  • To page
    180
  • Abstract
    We introduce a new class of shape approximation techniques for irregular triangular meshes. Our method approximates the geometry of the mesh using a linear combination of a small number of basis vectors. The basis vectors are functions of the mesh connectivity and of the mesh indices of a number of anchor vertices. There is a fundamental difference between the bases generated by our method and those generated by geometry-oblivious methods, such as Laplacian-based spectral methods. In the latter methods, the basis vectors are functions of the connectivity alone. The basis vectors of our method, in contrast, are geometry-aware since they depend on both the connectivity and on a binary tagging of vertices that are “geometrically important” in the given mesh (e.g., extrema). We show that, by defining the basis vectors to be the solutions of certain least-squares problems, the reconstruction problem reduces to solving a single sparse linear least-squares problem. We also show that this problem can be solved quickly using a state-ofthe- art sparse-matrix factorization algorithm. We show how to select the anchor vertices to define a compact effective basis from which an approximated shape can be reconstructed. Furthermore, we develop an incremental update of the factorization of the least-squares system. This allows a progressive scheme where an initial approximation is incrementally refined by a stream of anchor points. We show that the incremental update and solving the factored system are fast enough to allow an online refinement of the mesh geometry.
  • Keywords
    Shape approximation , Basis , linear least-squares. , mesh Laplacian
  • Journal title
    IEEE TRANSACTIONS ON VISUALIZATION AND COMPUTER GRAPHICS
  • Serial Year
    2005
  • Journal title
    IEEE TRANSACTIONS ON VISUALIZATION AND COMPUTER GRAPHICS
  • Record number

    401810