TOWARDS HYPERSEMITORIC SYSTEMS

Abstract

This survey gives a short and comprehensive introduction to a class of finitedimensional integrable systems known as hypersemitoric systems, recently introduced by Hohloch and Palmer in connection with the solution of the problem how to extend Hamiltonian circle actions on symplectic 4-manifolds to integrable systems with ‛nice' singularities. The quadratic spherical pendulum, the Euler and Lagrange tops (for generic values of the Casimirs), coupled-angular momenta, and the coupled spin oscillator system are all examples of hypersemitoric systems. Hypersemitoric systems are a natural generalization of so-called semitoric systems (introduced by Vũ Ngọc) which in turn generalize toric systems. Speaking in terms of bifurcations, semitoric systems are ‛toric systems with/after supercritical Hamiltonian-Hopf bifurcations'. Hypersemitoric systems are 'semitoric systems with, among others, subcritical Hamiltonian-Hopf bifurcations'. Whereas the symplectic geometry and spectral theory of toric and semitoric sytems is by now very well developed, the theory of hypersemitoric systems is still forming its shape. This short survey introduces the reader to this developing theory by presenting the necessary notions and results as well as its connections to other areas of mathematics and mathematical physic.