Hamiltonian and symplectic symmetries: an introduction

TL;DR

This paper reviews classical and recent results on Hamiltonian and symplectic symmetries in classical mechanics, providing an introduction to symplectic geometry and exploring the connections with combinatorics, integrable systems, and topology.

Contribution

It offers a comprehensive overview of the development and current state of Hamiltonian and symplectic group actions, including foundational concepts and recent advances.

Findings

Summarizes key historical results in symplectic group actions.

Highlights connections between symplectic symmetries and other mathematical fields.

Provides an accessible introduction to symplectic geometry for new researchers.

Abstract

Classical mechanical systems are modeled by a symplectic manifold $(M,\omega)$, and their symmetries, encoded in the action of a Lie group $G$ on $M$ by diffeomorphisms that preserves $\omega$. These actions, which are called "symplectic", have been studied in the past forty years, following the works of Atiyah, Delzant, Duistermaat, Guillemin, Heckman, Kostant, Souriau, and Sternberg in the 1970s and 1980s on symplectic actions of compact abelian Lie groups that are, in addition, of "Hamiltonian" type, i.e. they also satisfy Hamilton's equations. Since then a number of connections with combinatorics, finite dimensional integrable Hamiltonian systems, more general symplectic actions, and topology, have flourished. In this paper we review classical and recent results on Hamiltonian and non Hamiltonian symplectic group actions roughly starting from the results of these authors. The paper also serves as a quick introduction to the basics of symplectic geometry.