• Title of article

    Do blending and offsetting commute for Dupin cyclides? Original Research Article

  • Author/Authors

    Ching-Kuang Shene، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2000
  • Pages
    20
  • From page
    891
  • To page
    910
  • Abstract
    A common method for constructing blending Dupin cyclides for two cones having a common inscribed sphere of radius r>0 involves three steps: (1) computing the (−r) -offsets of the cones so that they share a common vertex, (2) constructing a blending cyclide for the offset cones, and (3) computing the r -offset of the cyclide. Unfortunately, this process does not always work properly. Worse, for some half-cones cases, none of the blending cyclides can be constructed this way. This paper studies this problem and presents two major contributions. First, it is shown that the offset construction is correct for the case of ε≠−r , where ε is the signed offset value; otherwise, a procedure must be followed for properly selecting a pair of principal circles of the blending cyclide. Second, based on Sheneʹs construction in “Blending two cones with Dupin cyclides”, CAGD, 15 (1998) 643–673, a new algorithm is available for constructing all possible blending cyclides for two half-cones. This paper also examines Allen and Duttaʹs theory of pure blends, which uses the offset construction. To help overcome the difficulties of Allen and Duttaʹs method, this paper suggests a new algorithm for constructing all possible pure blends. Thus, Sheneʹs diagonal construction is better and more reliable than the offset construction.
  • Keywords
    Natural quadrics , Common inscribed sphere , Blending , Offset , Dupin cyclide
  • Journal title
    Computer Aided Geometric Design
  • Serial Year
    2000
  • Journal title
    Computer Aided Geometric Design
  • Record number

    1138993