English

Functional calculus for semigroup generators via transference

Functional Analysis 2013-11-20 v2 Operator Algebras

Abstract

In this article we apply a recently established transference principle in order to obtain the boundedness of certain functional calculi for semigroup generators. In particular, it is proved that if A-A generates a C0C_0-semigroup on a Hilbert space, then for each τ>0\tau>0 the operator AA has a bounded calculus for the closed ideal of bounded holomorphic functions on a (sufficiently large) right half-plane that satisfy f(z)=O(eτRe(z))f(z)=O(e^{-\tau\textrm{Re}(z)}) as z|z|\rightarrow \infty. The bound of this calculus grows at most logarithmically as τ0\tau\searrow 0. As a consequence, f(A)f(A) is a bounded operator for each holomorphic function ff (on a right half-plane) with polynomial decay at \infty. Then we show that each semigroup generator has a so-called (strong) mm-bounded calculus for all mNm\in\mathbb{N}, and that this property characterizes semigroup generators. Similar results are obtained if the underlying Banach space is a UMD space. Upon restriction to so-called γ\gamma-bounded semigroups, the Hilbert space results actually hold in general Banach spaces.

Keywords

Cite

@article{arxiv.1301.4934,
  title  = {Functional calculus for semigroup generators via transference},
  author = {Markus Haase and Jan Rozendaal},
  journal= {arXiv preprint arXiv:1301.4934},
  year   = {2013}
}

Comments

25 pages, updated version. Final version published in Journal of Functional Analysis

R2 v1 2026-06-21T23:12:59.258Z