An h $h$ -principle for embeddings transverse to a contact structure

Pub Date : 2024-03-11 DOI:10.1112/topo.12326

Robert Cardona, Francisco Presas

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Abstract

Given a class of embeddings into a contact or a symplectic manifold, we give a sufficient condition, that we call isocontact or isosymplectic realization, for this class to satisfy a general $h$ -principle. The flexibility follows from the $h$ -principles for isocontact and isosymplectic embeddings, it provides a framework for classical results, and we give two new applications. Our main result is that embeddings transverse to a contact structure satisfy a full $h$ -principle in two cases: if the complement of the embedding is overtwisted, or when the intersection of the image of the formal derivative with the contact structure is strictly contained in a proper symplectic subbundle. We illustrate the general framework on symplectic manifolds by studying the universality of Hamiltonian dynamics on regular level sets via a class of embeddings.

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接触结构横向嵌入的 h $h$ 原则

给定一类嵌入到接触流形或交映流形的嵌入，我们给出一个充分条件，我们称之为等接触或等交映实现，使这一类嵌入满足一般的 h $h$ 原则。这种灵活性来自于等接触和等折射嵌入的 h $h$ 原则，它为经典结果提供了一个框架，我们还给出了两个新的应用。我们的主要结果是，在两种情况下，横向于接触结构的嵌入满足完整的 h $h$ 原则：如果嵌入的补集是超扭曲的，或者形式导数的图像与接触结构的交集严格包含在适当的交映子束带中。我们通过一类嵌入来研究正则水平集上哈密顿动力学的普遍性，以此说明交映流形上的一般框架。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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