• Title of article

    The linear pencil approach to rational interpolation Original Research Article

  • Author/Authors

    Bernhard Beckermann، نويسنده , , Maxim Derevyagin، نويسنده , , Alexei Zhedanov، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2010
  • Pages
    25
  • From page
    1322
  • To page
    1346
  • Abstract
    It is possible to generalize the fruitful interaction between (real or complex) Jacobi matrices, orthogonal polynomials and Padé approximants at infinity by considering rational interpolants, (bi)orthogonal rational functions and linear pencils zB−AzB−A of two tridiagonal matrices A,BA,B, following Spiridonov and Zhedanov. In the present paper, as well as revisiting the underlying generalized Favard theorem, we suggest a new criterion for the resolvent set of this linear pencil in terms of the underlying associated rational functions. This enables us to generalize several convergence results for Padé approximants in terms of complex Jacobi matrices to the more general case of convergence of rational interpolants in terms of the linear pencil. We also study generalizations of the Darboux transformations and the link to biorthogonal rational functions. Finally, for a Markov function and for pairwise conjugate interpolation points tending to ∞∞, we compute the spectrum and the numerical range of the underlying linear pencil explicitly.
  • Keywords
    Multipoint Padé approximation , MP continued fractions , Rational interpolation , Jacobi matrix , Linear pencils
  • Journal title
    Journal of Approximation Theory
  • Serial Year
    2010
  • Journal title
    Journal of Approximation Theory
  • Record number

    852803