Title of article
Biorthogonal polynomials and zero-mapping transformations
Author/Authors
A. Iserles، نويسنده , , S. P. N?rsett، نويسنده ,
Issue Information
هفته نامه با شماره پیاپی سال 1997
Pages
15
From page
129
To page
143
Abstract
The authors have presented in [1] a technique to generate transformations T of the set n of nth degree polynomials to itself such that if if p ε n has all its zeros in (c, d) then T{p} has all its zeros in (a, b), where (a, b) and (c, d) are given real intervals. The technique rests upon the derivation of an explicit form of biorthogonal polynomials whose Borel measure is strictly sign consistent and such that the ratio of consecutive generalized moments is a rational [1/1] function of the parameter. Specific instances of strictly sign consistent measures that have been debated in [1] include xμ dψ(x), μx dψ(x) and xlogqμ dψ(x), q ε (0, 1). In this paper, we identify all measures ψ such that their consecutive generalized moments have a rational [1/1] quotient, thereby characterizing all possible zero-mapping transformations of this kind.
Keywords
Special functions , Strict sign consistency , Biorthogonal polynomials
Journal title
Computers and Mathematics with Applications
Serial Year
1997
Journal title
Computers and Mathematics with Applications
Record number
917757
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