Universal composition operators

Abstract

A Hilbert space operator U is called universal (in the sense of Rota) if every Hilbert space operator is similar to a multiple of U restricted to one of its invariant subspaces. It follows that the Invariant Subspace Problem for Hilbert spaces is equivalent to the statement that all minimal invariant subspaces for U are one dimensional. In this article we characterize all linear fractional composition operators Cφ f=fφ that have universal translates on both the classical Hardy spaces H2(C+) and H2(D) of the half-plane and the unit disk respectively. The surprising new example is the composition operator on H2(D) with affine symbol φa(z)=az+(1-a) for 0<a<1. This leads to strong characterizations of minimal invariant subspaces and eigenvectors of Cφa and offers an alternative approach to the ISP.