• Title of article

    Exponential splines and minimal-support bases for curve representation Original Research Article

  • Author/Authors

    R. Delgado-Gonzalo، نويسنده , , P. Thévenaz، نويسنده , , M. Unser، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2012
  • Pages
    20
  • From page
    109
  • To page
    128
  • Abstract
    Our interest is to characterize the spline-like integer-shift-invariant bases capable of reproducing exponential polynomial curves. We prove that any compact-support function that reproduces a subspace of the exponential polynomials can be expressed as the convolution of an exponential B-spline with a compact-support distribution. As a direct consequence of this factorization theorem, we show that the minimal-support basis functions of that subspace are linear combinations of derivatives of exponential B-splines. These minimal-support basis functions form a natural multiscale hierarchy, which we utilize to design fast multiresolution algorithms and subdivision schemes for the representation of closed geometric curves. This makes them attractive from a computational point of view. Finally, we illustrate our scheme by constructing minimal-support bases that reproduce ellipses and higher-order harmonic curves.
  • Keywords
    Strang–Fix , Circular harmonics , Exponential B-spline , Exponential polynomial , Parameterization , Subdivision , interpolation
  • Journal title
    Computer Aided Geometric Design
  • Serial Year
    2012
  • Journal title
    Computer Aided Geometric Design
  • Record number

    1147726