Asymptotic representation of minimal polynomials on several intervals

Franz Peherstorfer

arXiv:1001.0491·math.CA·January 5, 2010·1 cites

Asymptotic representation of minimal polynomials on several intervals

Franz Peherstorfer

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Open Access

TL;DR

This paper provides an asymptotic representation of minimal polynomials on multiple intervals, contributing to the understanding of their behavior in complex approximation theory.

Contribution

It offers a new asymptotic formula for minimal polynomials on several intervals, extending previous results in approximation theory.

Findings

01

Derived asymptotic representations for minimal polynomials on multiple intervals

02

Extended theoretical understanding of polynomial behavior in complex domains

03

Provides foundational results for further research in approximation theory

Abstract

Asymptotic representation of minimal polynomials on several intervals is given. The last modifications and corrections of this manuscript were done by the author in the two months preceding his passing away in November 2009. The manuscript remained unsubmitted and is not published elsewhere.

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Taxonomy

TopicsMathematical functions and polynomials · Algebraic and Geometric Analysis · Holomorphic and Operator Theory