Growth of eigenvalues of Floer Hessians

Urs Frauenfelder; Joa Weber

arXiv:2408.00269·math.SG·August 2, 2024

Growth of eigenvalues of Floer Hessians

Urs Frauenfelder, Joa Weber

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TL;DR

This paper proves that the space of Floer Hessians contains infinitely many connected components, revealing complex topological structure in symplectic geometry.

Contribution

It establishes the existence of infinitely many connected components in the space of Floer Hessians, a novel topological insight.

Findings

01

Space of Floer Hessians has infinitely many connected components

02

Provides new understanding of the topology in symplectic geometry

03

Advances the study of Floer theory and its geometric implications

Abstract

In this article we prove that the space of Floer Hessians has infinitely many connected components.

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Taxonomy

TopicsMathematical Dynamics and Fractals · Meromorphic and Entire Functions · Advanced Differential Equations and Dynamical Systems