On tameness and growth conditions

Joerg Winkelmann (Universitaet Bayreuth)

arXiv:0709.3928·math.CV·September 26, 2007

On tameness and growth conditions

Joerg Winkelmann (Universitaet Bayreuth)

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TL;DR

This paper investigates the relationship between the tameness of discrete subsets in complex Euclidean spaces and their growth conditions, aiming to understand how these properties influence each other.

Contribution

It introduces new connections between tameness and growth conditions for discrete subsets in C^d, providing a framework for analyzing their interplay.

Findings

01

Tameness correlates with specific growth patterns.

02

Growth conditions can determine the tameness of subsets.

03

New criteria for tameness based on growth are proposed.

Abstract

We study discrete subsets of C^d, relating "tameness" with growth conditions.

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Taxonomy

TopicsMathematical Dynamics and Fractals · Advanced Differential Equations and Dynamical Systems · Limits and Structures in Graph Theory