Integrable Hamiltonian systems provide a rigorous framework in which complex dynamical behaviour can be understood through the existence of sufficient independent constants of motion. In particular, ...

Integrable systems occupy a central role in mathematical physics due to their distinctive property of possessing an infinite number of conserved quantities, which allows for exact solution methods.

Thermalization in classical systems can be well-understood by ergodicity. While ergodicity is absent for quantum systems, it is generally believed that the non-integrable quantum systems should ...

Philosophical Transactions: Mathematical, Physical and Engineering Sciences, Vol. 376, No. 2131, Theme issue: Finite dimensional integrable systems: new trends and methods (28 October 2018), pp. 1-29 ...