Integrable systems associated to the filtrations of Lie algebras

Abstract

In 1983 Bogoyavlenski conjectured that if the Euler equations on a Lie algebra g0 are integrable, then their certain extensions to semisimple lie algebras g related to the filtrations of Lie algebras g0⊂ g1⊂ g2…⊂ gn-1⊂ gn= g are integrable as well. In particular, by taking g0=\0\ and natural filtrations of so(n) and u(n), we have Gel'fand-Cetlin integrable systems. We proved the conjecture for filtrations of compact Lie algebras g: the system are integrable in a noncommutative sense by means of polynomial integrals. Various constructions of complete commutative polynomial integrals for the system are also given.