Integrable systems form a distinguished class of dynamical models admitting exact solutions through analytical methods. In classical mechanics, Liouville integrability requires as many independent ...

Integrable systems, a cornerstone in mathematical physics, are distinguished by the existence of an infinite number of conserved quantities and exact solution methods. These systems, ranging from the ...

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 ...