Completeness of superintegrability in two-dimensional constant curvature   spaces

E.G. Kalnins; J.M. Kress; G.S. Pogosyan; W. Miller Jr

arXiv:math-ph/0102006·math-ph·May 23, 2007

Completeness of superintegrability in two-dimensional constant curvature spaces

E.G. Kalnins, J.M. Kress, G.S. Pogosyan, W. Miller Jr

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TL;DR

This paper classifies all classical superintegrable Hamiltonian systems with second-order constants of motion in two-dimensional complex Euclidean space and on the complex 2-sphere, using group theoretical methods.

Contribution

It provides a complete classification of superintegrable systems in these spaces, extending previous results to complex settings with a unified approach.

Findings

01

Classification of superintegrable Hamiltonians in Euclidean space.

02

Classification of superintegrable Hamiltonians on the complex 2-sphere.

03

Use of group properties to achieve general classification.

Abstract

We classify the Hamiltonians $H = p_{x}^{2} + p_{y}^{2} + V (x, y)$ of all classical superintegrable systems in two dimensional complex Euclidean space with second-order constants of the motion. We similarly classify the superintegrable Hamiltonians $H = J_{1}^{2} + J_{2}^{2} + J_{3}^{2} + V (x, y, z)$ on the complex 2-sphere where $x^{2} + y^{2} + z^{2} = 1$ . This is achieved in all generality using properties of the complex Euclidean group and the complex orthogonal group.

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