The Hardy-Weyl algebra

Abstract

We study the algebra A generated by the Hardy operator H and the operator Mx of multiplication by x on L2[0,1]. We call A the Hardy-Weyl algebra. We show that its quotient by the compact operators is isomorphic to the algebra of functions that are continuous on and analytic on the interior of for a planar set = [-1,0] D(1,1), which we call the lollipop. We find a Toeplitz-like short exact sequence for the C*-algebra generated by A. We study the operator Z = H - Mx, show that its point spectrum is (-1,0] D(1,1), and that the eigenvalues grow in multiplicity as the points move to 0 from the left.

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