On subordination of holomorphic semigroups

Abstract

We prove that for any Bernstein function the operator -(A) generates a holomorphic C0-semigroup (e-t(A))t 0 on a Banach space, whenever -A does. This answers a question posed by Kishimoto and Robinson. Moreover, giving a positive answer to a question by Berg, Boyadzhiev and de Laubenfels, we show that (e-t(A))t 0 is holomorphic in the holomorphy sector of (e-tA)t 0, and if (e-tA)t 0 is sectorially bounded in this sector then (e-t(A))t 0 has the same property. We also obtain new sufficient conditions on in order that, for every Banach space X, the semigroup (e-t(A))t 0 on X is holomorphic whenever (e-tA)t 0 is a bounded C0-semigroup on X. These conditions improve and generalize well-known results by Carasso-Kato and Fujita.