Maximum Principle and Asymptotic Properties of Hermite--Pad\'e Polynomials

Abstract

In the paper, we discuss how it would be possible to succeed in Stahl's novel approach, 1987--1988, to explore Hermite--Pad\'e polynomials based on Riemann surface properties. In particular, we explore the limit zero distribution of type I Hermite--Pad\'e polynomials Qn,0,Qn,1,Qn,2, degQn,j≤n, for a collection of three analytic elements [1,f∞,f2∞]. The element f∞ is an element of a function f from the class C(z,w) where w is supposed to be from the class Z1/2([-1,1]) of multivalued analytic functions generated by the inverse Zhukovskii function with the exponents from the set \1/2\. The Riemann surface corresponding to f∈ C(z,w) is a four-sheeted Riemann surface R4(w) and all branch points of f are of the first order (i.e., all branch points are of square root type). Since the algebraic function f∈ C(z,w) is of fourth order and we consider the triple of the analytic elements [1,f∞,f2∞] but not the quadruple [1,f∞,f2∞,f3∞] ones, the result is new and does not follow from the known results. As in previous paper arXiv: 2108.00339 and following to Stahl's ideas, 1987--1988, we do not use the orthogonality relations at all. The proof is based on the maximum principle only.