Insights on the Ces\`aro operator: shift semigroups and invariant subspaces

Abstract

A closed subspace is invariant under the Ces\`aro operator C on the classical Hardy space H2( D) if and only if its orthogonal complement is invariant under the C0-semigroup of composition operators induced by the affine maps t(z)= e-tz + 1 - e-t for t≥ 0 and z∈ D. The corresponding result also holds in the Hardy spaces Hp( D) for 1<p<∞. Moreover, in the Hilbert space setting, by linking the invariant subspaces of C to the lattice of the closed invariant subspaces of the standard right-shift semigroup acting on a particular weighted L2-space on the line, we exhibit a large class of non-trivial closed invariant subspaces and provide a complete characterization of the finite codimensional ones, establishing, in particular, the limits of such an approach towards describing the lattice of all invariant subspaces of C. Finally, we present a functional calculus argument which allows us to extend a recent result by Mashreghi, Ptak and Ross regarding the square root of C, and discuss its invariant subspaces.