Semigroups in 3-graded Lie groups and endomorphisms of standard subspaces

Abstract

Let V be a standard subspace in the complex Hilbert space H and U : G U(H) be a unitary representation of a finite dimensional Lie group. We assume the existence of an element h in the Lie algebra of G such that U(exp th) is the modular group of V and that the modular involution JV normalizes U(G). We want to determine the semigroup SV = \ g∈ G : U(g)V ⊂eq V\. In previous work we have seen that its infinitesimal generators span a Lie algebra on which ad h defines a 3-grading, and here we completely determine the semigroup SV under the assumption that ad h defines a 3-grading. Concretely, we show that the ad h-eigenspaces for the eigenvalue 1 contain closed convex cones C, such that SV = exp(C+) GV exp(C-), where GV is the stabilizer of V in G. To obtain this result we compare several subsemigroups of G specified by the grading and the positive cone CU of U. In particular, we show that the orbit U(G)V, endowed with the inclusion order, is an ordered symmetric space covering the adjoint orbit Ad(G)h, endowed with the partial order defined by~CU.