Local spectral theory for subordinated operators: the Ces\`aro operator and beyond

Abstract

We study local spectral properties for subordinated operators arising from C0-semigroups. Specifically, if T=(Tt)t≥ 0 is a C0-semigroup acting boundedly on a complex Banach space and H = ∫0∞ Tt\; d(t) is the subordinated operator associated to T, where is a sufficiently regular complex Borel measure supported on [0,∞), it is shown that H does not enjoy the Single Valued Extension Property (SVEP) and has dense glocal spectral subspaces in terms of the spectrum of the generator of T. Likewise, the adjoint H has trivial spectral subspaces and enjoys the Dunford property. As an application, for the classical Ces\`aro operator C acting on the Hardy spaces Hp (1<p<∞), it follows that the local spectrum of C at any non-zero Hp-function or the spectrum of the restriction of C to any of its non-trivial closed invariant subspaces coincides with the spectrum of C. Finally, we characterize the local spectral properties of subordinated operators arising from hyperbolic semigroups of composition operators acting on Hp (1<p<∞), which will depend only on the geometry of the associated Koenigs domain.