Lie-Poisson theory for direct limit Lie algebras

Abstract

In this paper, we develop the fundamentals of Lie-Poisson theory for direct limits G= Gn of complex algebraic groups Gn and their Lie algebras = n. We show that *=∈vlimn* has the structure of a Poisson provariety and that each coadjoint orbit of G on * has the structure of an ind-variety. We construct a weak symplectic form on every coadjoint orbit and prove that the coadjoint orbits form a weak symplectic foliation of the Poisson provariety *. We apply our results to the specific setting of G=GL(∞)= GL(n,) and *= M(∞)=∈vlim (n,), the space of infinite complex matrices with arbitrary entries. We construct a Gelfand-Zeitlin integrable system on M(∞), which generalizes the one constructed by Kostant and Wallach on (n,). The system integrates to an action of a direct limit group A(∞) on M(∞), whose generic orbits are Lagrangian ind-subvarieties of the corresponding coadjoint orbit of GL(∞) on M(∞).