Quantitative characterization in contact Hamiltonian dynamics -- I
Abstract
Based on the contact Hamiltonian Floer theory established by Will J. Merry and the second author that applies to any admissible contact Hamiltonian system , where is a contact Hamiltonian function on a Liouville fillable contact manifold , we associate a persistence module to , called a gapped module, that is parametrized only by a partially ordered set. It enables us to define various numerical Floer-theoretic invariants. In this paper, we focus on the contact spectral invariants and their applications. Several key properties are proved, which include stability with respect to the Shelukhin-Hofer norm in contact geometry and a triangle inequality of contact spectral invariants. In particular, our stability property does not involve any conformal factors; our triangle inequality is derived from a novel analysis on pair-of-pants in the contact Hamiltonian Floer homology. While this paper was nearing completion, the authors were made aware of upcoming work by Dylan Cant, where a similar persistence module for contact Hamiltonian dynamics was constructed.
Cite
@article{arxiv.2309.00527,
title = {Quantitative characterization in contact Hamiltonian dynamics -- I},
author = {Danijel Djordjević and Igor Uljarević and Jun Zhang},
journal= {arXiv preprint arXiv:2309.00527},
year = {2023}
}
Comments
47 pages, 1 figure