Classification of multiplicity free Hamiltonian actions of complex tori on Stein manifolds

Abstract

A Hamiltonian action of a complex torus on a symplectic complex manifold is said to be multiplicity free if a general orbit is a lagrangian submanifold. To any multiplicity free Hamiltonian action of a complex torus T (×)n on a Stein manifold X we assign a certain 5-tuple consisting of a Stein manifold Y, an \'etale map Y *, a set of divisors on Y and elements of H2(Y,) n, H2(Y,). We show that X is uniquely determined by this invariants. Furthermore, we describe all 5-tuples arising in this way.