• Title of article

    Control point based exact description of a class of closed curves and surfaces Original Research Article

  • Author/Authors

    ?goston R?th، نويسنده , , Imre Juh?sz، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2010
  • Pages
    23
  • From page
    179
  • To page
    201
  • Abstract
    Based on cyclic curves/surfaces introduced in , we specify control point configurations that result an exact description of those closed curves and surfaces the coordinate functions of which are (separable) trigonometric polynomials of finite degree. This class of curves/surfaces comprises several famous closed curves like ellipses, epi- and hypocycloids, Lissajous curves, torus knots, foliums; and surfaces such as sphere, torus and other surfaces of revolution, and even special surfaces like the non-orientable Roman surface of Steiner. Moreover, we show that higher order (mixed partial) derivatives of cyclic curves/surfaces are also cyclic curves/surfaces, and we describe the connection between the cyclic and Fourier bases of the vector space of trigonometric polynomials of finite degree.
  • Keywords
    Closed surfaces , Cyclic surfaces , Closed curves , Basis transformation , Cyclic curves
  • Journal title
    Computer Aided Geometric Design
  • Serial Year
    2010
  • Journal title
    Computer Aided Geometric Design
  • Record number

    1147630