Real Submanifolds in Complex Spaces: Upgrades

Valentin Burcea

arXiv:1503.07177·math.CV·January 1, 2024

Real Submanifolds in Complex Spaces: Upgrades

Valentin Burcea

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TL;DR

This paper extends Moser's theorem to a broader setting involving Shilov boundaries of bounded symmetric domains, providing new insights into the structure of real submanifolds in complex spaces.

Contribution

It introduces a generalized version of Moser's theorem applicable to Shilov boundaries of bounded symmetric domains, expanding the theoretical framework.

Findings

01

Established a new analogue of Moser's theorem

02

Extended the theorem to Shilov boundaries of symmetric domains

03

Enhanced understanding of real submanifolds in complex analysis

Abstract

It is proven a new analogue of the Theorem of Moser in a generalized context defined by Shilov Boundaries of Bounded and Symmetric Domains.

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Taxonomy

TopicsGeometric Analysis and Curvature Flows · Geometry and complex manifolds · Advanced Numerical Analysis Techniques