Poisson Algebras and 3D Superintegrable Hamiltonian Systems

TL;DR

This paper explores the structure of Poisson algebras in 3D superintegrable Hamiltonian systems, revealing how symmetry and conformal symmetry algebras influence integrability and superintegrability through algebraic and geometric methods.

Contribution

It introduces a novel approach to embedding Lie algebras into larger structures using Poisson brackets and analyzes the resulting superintegrable systems and their algebraic properties.

Findings

Identified Poisson algebra structures for superintegrable systems.

Extended symmetry automorphisms to full Poisson algebras.

Derived conditions for potentials to maintain integrability.

Abstract

Using a Poisson bracket representation, in 3D, of the Lie algebra $\mathfrak{sl}(2)$, we first use highest weight representations to embed this into larger Lie algebras. These are then interpreted as symmetry and conformal symmetry algebras of the "kinetic energy", related to the quadratic Casimir function. We then consider the potentials which can be added, whilst remaining integrable, leading to families of separable systems, depending upon arbitrary functions of a single variable. Adding further integrals, in the superintegrable case, restricts these functions to specific forms, depending upon a finite number of arbitrary parameters. The Poisson algebras of these superintegrable systems are studied. The automorphisms of the symmetry algebra of the kinetic energy are extended to the full Poisson algebra, enabling us to build the full set of Poisson relations.