Nets of standard subspaces induced by antiunitary representations of admissible Lie groups I

Abstract

Let (π, H) be a strongly continuous unitary representation of a 1-connected Lie group G such that the Lie algebra g of G is generated by the positive cone Cπ := \x ∈ g : -i∂ π(x) ≥ 0\ and an element h for which the adjoint representation of h induces a 3-grading of g. Moreover, suppose that (π, H) extends to an antiunitary representation of the extended Lie group Gτ := G \1, τG\, where τG is an involutive automorphism of G with L(τG) = eiπad h. In a recent work by Neeb and \'Olafsson, a method for constructing nets of standard subspaces of H indexed by open regions of G has been introduced and applied in the case where G is semisimple. In this paper, we extend this construction to general Lie groups G, provided the above assumptions are satisfied and the center of the ideal gC = Cπ - Cπ of g is one-dimensional. The case where the center of gC has more than one dimension will be discussed in a separate paper.