Dichotomy results for norm estimates in operator semigroups
Abstract
This is a survey paper concerned with strongly continuous semigroups in a Banach algebra (often itself simply the algebra of bounded linear operators on a Banach space). These are defined either on or on a sector in the complex plane, in which case they are supposed analytic. However, the semigroups are not assumed to be strongly continuous at 0. The results in this survey, beginning with classical theorems of Beurling, Kato and Neuberger and concluding with recent work by the authors, are of the nature of "0-1" laws, indicating that the quantitative behaviour of the semigroup at the origin provides additional qualitative information, such as uniform continuity or analyticity.
Cite
@article{arxiv.1502.05251,
title = {Dichotomy results for norm estimates in operator semigroups},
author = {I. Chalendar and J. Esterle and J. R. Partington},
journal= {arXiv preprint arXiv:1502.05251},
year = {2015}
}
Comments
19 pages. Presented at a conference in honour of Charles Batty. To appear in "Semigroups meet Complex Analysis, Harmonic Analysis and Mathematical Physics", Ed. by W. Arendt, R. Chill and Y. Tomilov