Linear Chebyshev Complex Function Approximation.

Abstract

A new computational technique is described for the Chebyshev, or minimax, approximation of a given complex valued function by means of linear combinations of given complex valued basis functions. The domain of definition of all functions can be any finite set whatever. Neither the basis functions nor the function approximated need satisfy any special hypotheses beyond the requirement that they be defined on a common domain. Theoretical upper and lower bounds on the accuracy of the computed Chebyshev error are derived. These bounds permit both a priori and a posteriori error assessments. Efforts to extend the method to functions whose domain of definition is a continuum are discussed. Numerical examples and a FORTRAN program listing are included. An application is presented involving re-shading a 50-element antenna array to minimize the effects of a 10% element failure rate, while maintaining full steering capability and mainlobe beamwidth. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Feb 26, 1981
Accession Number
ADA098309

Entities

People

  • Albert H. Nuttall
  • Roy L. Streit

Organizations

  • Naval Underwater Systems Center

Tags

Communities of Interest

  • Biomedical
  • Ground and Sea Platforms
  • Space
  • Weapons Technologies

DTIC Thesaurus Topics

  • Algorithms
  • Antenna Arrays
  • Antennas
  • Arrays
  • Chebyshev Approximations
  • Computations
  • Computer Programming
  • Computer Programs
  • Computers
  • Data Sets
  • Electrical Engineering
  • Linear Programming
  • Mainframe Computers
  • Numbers
  • Precision
  • Real Variables
  • Simplex Method

Readers

  • Approximation Theory.
  • Finite Element Method (FEM) for solving Partial Differential Equations (PDEs)
  • Phased Array Antenna Design.