On Anosovity, divergence and bi-contact surgery

TL;DR

This paper provides a metric and contact geometric analysis of Anosov flows in dimension 3, explores symmetries related to invariant volume forms, and demonstrates the applicability of bi-contact surgery near periodic orbits.

Contribution

It introduces new metric and contact geometric characterizations of Anosov flows and extends bi-contact surgery techniques to arbitrary small neighborhoods of periodic orbits.

Findings

Characterization of Anosov flows via growth rates and metrics

Symmetry analysis of volume-preserving Anosov flows using contact and Liouville geometry

Application of bi-contact surgery near periodic orbits of Anosov flows

Abstract

We discuss a metric description of the divergence of a (projectively) Anosov flow in dimension 3, in terms of its associated growth rates and give metric and contact geometric characterizations of when a projectively Anosov flow is Anosov. Then, we study the symmetries that the existence of an invariant volume form yields on the geometry of an Anosov flow, from various viewpoints of the theory of contact hyperbolas, Reeb dynamics and Liouville geometry, and give characterizations of when an Anosov flow is volume preserving in terms of those theories. We finally use our study to show that the bi-contact surgery operations of Salmoiraghi can be applied in an arbitrary small neighborhood of a periodic orbit of any Anosov flow. In particular, we conclude that the Goodman surgery of Anosov flows can be performed using a bi-contact surgery of Salmoiraghi.