• DocumentCode
    2071088
  • Title

    Computational metrology of the circle

  • Author

    Pegna, Joseph ; Guo, Chi

  • Author_Institution
    Dept. of Mech. Eng., Concordia Univ., Montreal, Que., Canada
  • fYear
    1998
  • fDate
    22-26 Jun 1998
  • Firstpage
    350
  • Lastpage
    363
  • Abstract
    Fitting a circle to a set of data points arranged in a circular pattern is a common problem in many fields of science and engineering. Specific applications in metrology include center position and circularity measurements. The fitting criteria usually depends on the application and varies with the statistical error model. Chebyshev fits, also known as minmax or least L-infinity fits, are of particular interest in metrology where they quantify the form error in addition to yielding an allegedly more objective position assessment. The paper offers further empirical evidence to support this conjecture. The Chebyshev circular fit problem can be solved using common computational geometry tools but the computational complexity of the algorithm is prohibitive for real-time applications. A substitute heuristic marching algorithm was developed and implemented. After a comprehensive state of the art review, the paper presents the marching algorithm and evaluates its convergence properties for full and partial circular data sets. A comparative study of convergence rate and accuracy is presented with respect to exhaustive computational geometry solutions and other fitting criteria
  • Keywords
    Chebyshev approximation; angular measurement; computational complexity; computational geometry; convergence of numerical methods; curve fitting; Chebyshev fits; accuracy; center position measurement; circle fitting; circularity measurement; computational complexity; computational geometry tools; computational metrology; convergence properties; data points; engineering; form error; full circular data sets; heuristic marching algorithm; least L-infinity fits; minmax fits; objective position assessment; partial circular data sets; science; statistical error model; Application software; Chebyshev approximation; Computational geometry; Computer errors; Computer vision; Data engineering; Design engineering; Error analysis; Heuristic algorithms; Metrology;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Computer Graphics International, 1998. Proceedings
  • Conference_Location
    Hannover
  • Print_ISBN
    0-8186-8445-3
  • Type

    conf

  • DOI
    10.1109/CGI.1998.694285
  • Filename
    694285