Geometric proof of the $\lambda$-lemma

Eric Bedford; Tanya Firsova

arXiv:1501.04673·math.CV·June 2, 2015

Geometric proof of the $\lambda$-lemma

Eric Bedford, Tanya Firsova

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TL;DR

This paper presents a geometric method for proving the λ-lemma, emphasizing the significance of pseudoconvexity in the proof process.

Contribution

It introduces a novel geometric approach to the λ-lemma proof, highlighting the role of pseudoconvexity.

Findings

01

Pseudoconvexity is crucial in the geometric proof.

02

The approach offers new insights into complex dynamics.

03

The proof simplifies understanding of the λ-lemma.

Abstract

We give a geometric approach to the proof of the $λ$ -lemma. In particular, we point out the role pseudoconvexity plays in the proof.

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Taxonomy

TopicsMathematics and Applications · Point processes and geometric inequalities · Functional Equations Stability Results