Representations of Dirichlet Operator Algebras

Abstract

A Dirichlet operator algebra is a nonself-adjoint operator algebra A with the property that A + A* is norm-dense in the C*-envelope of A. We show that, under certain restrictions, A has a family of completely contractive representations \πi\ with the property that the invariant subspaces of πi(A) are totally ordered, and such that, for all a ∈ A, \ ||a|| = i ||πi(a)||. The class of Dirichlet algebras includes strongly maximal triangular AF algebras, certain semicrossed product algebras, and gauge-invariant subalgebras of Cuntz C*-algebras. The main tool is the duality theory for essentially principal etale groupoids.