The minimum principle from a Hamiltonian point of view

Abstract

Let G be a complex Lie group, GR a real form of G and X a GR-stable domain of holomorphy in a complex G-manifold. If there is a GR-invariant strictly plurisubharmonic function on X which has certain exhaustion properties, then we show that the extended domain G.X is also a domain of holomorphy. As an application we give a proof of the extended future tube conjecture. This is the assertion that G.X is a domain of holomorphy in the case where X is the N-fold product of the tube domain in C4 over the positive light cone in R4 and G is the connected complex Lorentz group acting diagonally.