Symplectic maps of complex domains into complex space forms

Abstract

Let M⊂n be a complex domain of n endowed with a rotation invariant form ω= i2 ∂∂. In this paper we describe sufficient conditions on the potential for (M, ω) to admit a symplectic embedding (explicitely described in terms of ) into a complex space form of the same dimension of M. In particular we also provide conditions on for (M, ω) to admit global symplectic coordinates. As an application of our results we prove that each of the Ricci flat (but not flat) forms on 2 constructed by LeBrun (Taub-NUT metric) admits explicitely computable global symplectic coordinates.