Reflexivity of the translation-dilation algebras on L2(R)

Abstract

The hyperbolic algebra Ah, studied recently by Katavolos and Power, is the weak star closed operator algebra on L2(R) generated by H∞(R), as multiplication operators, and by the dilation operators Vt, t ≥ 0, given by Vt f(x) = et/2 f(et x). We show that Ah is a reflexive operator algebra and that the four dimensional manifold Lat Ah (with the natural topology) is the reflexive hull of a natural two dimensional subspace.

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