Finite dimensional semigroups of unitary endomorphisms of standard subspaces

Abstract

Let V be a standard subspace in the complex Hilbert space H and G be a finite dimensional Lie group of unitary and antiunitary operators on H containing the modular group (Vit)t ∈ R of V and the corresponding modular conjugation~JV. We study the semigroup \[ SV = \ g∈ G U(H) : gV ⊂eq V\ \] and determine its Lie wedge L(SV) = \ x ∈ L(G) : exp(R+ x) ⊂eq SV\, i.e., the generators of its one-parameter subsemigroups in the Lie algebra L(G) of~G. The semigroup SV is analyzed in terms of antiunitary representations and their analytic extension to semigroups of the form G exp(iC), where C ⊂eq L(G) is an Ad(G)-invariant closed convex cone. Our main results assert that the Lie wedge L(SV) spans a 3-graded Lie subalgebra in which it can be described explicitly in terms of the involution τ of L(G) induced by JV, the generator h ∈ L(G)τ of the modular group, and the positive cone of the corresponding representation. We also derive some global information on the semigroup SV itself