Title of article
On the Convergence of Bounded J-Fractions on the Resolvent Set of the Corresponding Second Order Difference Operator Original Research Article
Author/Authors
Bernhard Beckermann، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1999
Pages
40
From page
369
To page
408
Abstract
We study connections between continued fractions of type J and spectral properties of second order difference operators with complex coefficients. It is known that the convergents of a bounded J-fraction are diagonal Padé approximants of the Weyl function of the corresponding difference operator and that a bounded J-fraction converges uniformly to the Weyl function in some neighborhood of infinity. In this paper we establish convergence in capacity in the unbounded connected component of the resolvent set of the difference operator and specify the rate of convergence. Furthermore, we show that the absence of poles of Padé approximants in some subdomain implies already local uniform convergence. This enables us to verify the Baker–Gammel–Wills conjecture for a subclass of Weyl functions. For establishing these convergence results, we study the ratio and the nth root asymptotic behavior of Padé denominators of bounded J-fractions and give relations with the Green function of the unbounded connected component of the resolvent set. In addition, we show that the number of “spurious” Padé poles in this set may be bounded.
Keywords
* Padé approximation , * Baker–Gammel–Wills conjecture , * Weyl function , * difference operator , * convergence of J-fractions
Journal title
Journal of Approximation Theory
Serial Year
1999
Journal title
Journal of Approximation Theory
Record number
851728
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