On rational approximation of algebraic functions
摘要
We construct a new scheme of approximation of any multivalued algebraic function by a sequence of rational functions. The latter sequence is generated by a recurrence relation which is completely determined by the algebraic equation satisfied by . Compared to the usual Pad\'e approximation our scheme has a number of advantages, such as simple computational procedures that allow us to prove natural analogs of the Pad\'e Conjecture and Nuttall's Conjecture for the sequence in the complement , where is the union of a finite number of segments of real algebraic curves and finitely many isolated points. In particular, our construction makes it possible to control the behavior of spurious poles and to describe the asymptotic ratio distribution of the family . As an application we settle the so-called 3-conjecture of Egecioglu {\em et al} dealing with a 4-term recursion related to a polynomial Riemann Hypothesis.
引用
@article{arxiv.math/0409353,
title = {On rational approximation of algebraic functions},
author = {Julius Borcea and Rikard Bögvad and Boris Shapiro},
journal= {arXiv preprint arXiv:math/0409353},
year = {2007}
}
备注
25 pages, 8 figures, LaTeX2e, revised version to appear in Advances in Mathematics