English

Type II Hermite-Pad\'e approximation to the exponential function

Classical Analysis and ODEs 2010-07-30 v1 Complex Variables

Abstract

We obtain strong and uniform asymptotics in every domain of the complex plane for the scaled polynomials a(3nz)a (3nz), b(3nz)b (3nz), and c(3nz)c (3nz) where aa, bb, and cc are the type II Hermite-Pad\'e approximants to the exponential function of respective degrees 2n+22n+2, 2n2n and 2n2n, defined by a(z)ezb(z)=\O(z3n+2)a (z)e^{-z}-b (z)=\O (z^{3n+2}) and a(z)ezc(z)=\O(z3n+2)a (z)e^{z}-c (z)={\O}(z^{3n+2}) as z0z\to 0. Our analysis relies on a characterization of these polynomials in terms of a 3×33\times 3 matrix Riemann-Hilbert problem which, as a consequence of the famous Mahler relations, corresponds by a simple transformation to a similar Riemann-Hilbert problem for type I Hermite-Pad\'e approximants. Due to this relation, the study that was performed in previous work, based on the Deift-Zhou steepest descent method for Riemann-Hilbert problems, can be reused to establish our present results.

Cite

@article{arxiv.math/0510278,
  title  = {Type II Hermite-Pad\'e approximation to the exponential function},
  author = {A. B. J. Kuijlaars and H. Stahl and W. Van Assche and F. Wielonsky},
  journal= {arXiv preprint arXiv:math/0510278},
  year   = {2010}
}

Comments

20 pages, 5 figures