Honda-Huang's work on contact convexity revisited

Yakov Eliashberg; Dishant Pancholi

arXiv:2207.07185·math.SG·October 30, 2025

Honda-Huang's work on contact convexity revisited

Yakov Eliashberg, Dishant Pancholi

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TL;DR

This paper revisits Honda and Huang's work on contact convexity, providing a simplified proof of their main theorem in high-dimensional contact topology.

Contribution

It offers a more accessible proof of Honda and Huang's key result on contact convexity in high dimensions.

Findings

01

Simplified proof of Honda and Huang's main theorem

02

Enhanced understanding of contact convexity in high dimensions

03

Potential for broader application in contact topology

Abstract

Following the overall strategy of the paper ``Convex hypersurfaces in contact topology" by Ko Honda and Yang Huang on contact convexity in high dimensions, we present a simplified proof of their main result.

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Taxonomy

TopicsGeometric and Algebraic Topology · Geometric Analysis and Curvature Flows · Point processes and geometric inequalities