On Algebraic Integrability of Gelfand-Zeitlin fields

Abstract

We generalize a result of Kostant and Wallach concerning the algebraic integrability of the Gelfand-Zeitlin vector fields to the full set of strongly regular elements in gl(n,C). We use decomposition classes to stratify the strongly regular set by subvarieties XD. We construct an \'etale cover g of XD and show that XD and g are smooth and irreducible. We then use Poisson geometry to lift the Gelfand-Zeitlin vector fields on XD to Hamiltonian vector fields on g and integrate these vector fields to an action of a connected, commutative algebraic group.