On an invariance property of the space of smooth vectors

Abstract

Let (π, H) be a continuous unitary representation of the (infinite dimensional) Lie group G and γ \: R Aut(G) define a continuous action of R on G. Suppose that π\#(g,t) = π(g) Ut defines a continuous unitary representation of the semidirect product group G γ R. The first main theorem of the present note provides criteria for the invariance of the space H∞ of smooth vectors of π under the operators Uf = ∫ R f(t)Ut\, dt for f ∈ L1( R), resp., f ∈ S( R). Using this theorem we show that, for suitably defined spectral subspaces g C(E), E ⊂eq R, in the complexified Lie algebra g C, and H∞(F), F⊂eq R, for U in H∞, we have \[ dπ( g C(E)) H∞(F) ⊂eq H∞(E + F).\]