KIAM Main page Web Library  •  Publication Searh   

KIAM Preprint  28, Moscow, 2008
Authors: Aptekarev A. I.
Matrix Riemann-Hilbert Analysis for the Case of Higher Genus Asymptotics of Polynomials Orthogonal on a System of Intervals
The method of the matrix Riemann-Hilbert problem is adapted for obtaining the strong asymptotics of polynomials orthogonal on a system of intervals on the real axis. The use of the Riemann theta-functions for deriving the asymptotical formulas is the main ingredient of the approach. An extension of the technique under consideration to Boundary Values Problems for analytic matrix functions of higher dimensions (greater than 2x2) is the main motivation of the work. Precisely this type of problem arise under asymptotical analysis of the Hermite-Pade approximants. The paper is continuation of the series of the lecture notes devoted to exposition of the 'Riemann-Hilbert matrix problem' asymptotical techniques.
Publication language: english,  pages: 23
Research direction:
Mathematical problems and theory of numerical methods
English source text:
List of publications citation:
Export link to publication in format:   RIS    BibTeX
View statistics (updated once a day)
over the last 30 days 0 (-1), total hit from 01.09.2019 43
About authors:
  • Aptekarev Alexander Ivanovich, RAS