Holomorphic mappings preserving Minkowski functionals

Lukasz Kosinski

arXiv:1010.2499·math.CV·October 14, 2010

Holomorphic mappings preserving Minkowski functionals

Lukasz Kosinski

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TL;DR

This paper proves that equality of Minkowski functionals under open holomorphic maps implies a polynomial relation between the maps, extending previous results to quasi-balanced domains and simplifying existing proofs.

Contribution

It establishes new conditions under which Minkowski functional equalities imply polynomial relations, generalizing to quasi-balanced domains and simplifying prior proofs.

Findings

01

Equality of Minkowski functionals extends from neighborhood to entire domain.

02

Polynomial relations between holomorphic maps are derived.

03

Results are generalized to quasi-balanced domains.

Abstract

We show that the equality $m_{1} (f (x)) = m_{2} (g (x))$ for $x$ in a neighborhood of a point $a$ remains valid for all $x$ provided that $f$ and $g$ are open holomorphic maps, $f (a) = g (a) = 0$ and $m_{1},$ $m_{2}$ are Minkowski functionals of bounded balanced domains. Moreover, a polynomial relation between $f$ and $g$ is obtained. Next we generalize these results to bounded quasi-balanced domains. Moreover, the main results of \cite{Ber-Piz} and \cite{Bou} are significantly extended and their proofs are essentially simplified.

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Taxonomy

TopicsHolomorphic and Operator Theory · Meromorphic and Entire Functions · Analytic and geometric function theory