Generalized vector valued almost periodic and ergodic distributions
Abstract
For let consist of all with for all . Here is a Banach space, or . Usually . The map is iteration complete, that is . Under suitable assumptions , and similarly for . Almost periodic -valued distributions with almost periodic (ap) functions are characterized in several ways. Various generalizations of the Bohl-Bohr-Kadets theorem on the almost periodicity of the indefinite integral of an ap or almost automorphic function are obtained. On , the class of ergodic functions, a mean can be constructed which gives Fourier series. Special cases of are the Bohr ap, Stepanoff ap, almost automorphic, asymptotically ap, Eberlein weakly ap, pseudo ap and (totally) ergodic functions . Then always is strictly contained in . The relations between , and subclasses are discussed. For many of the above results a new -condition is needed, we show that it holds for most of the needed in applications. Also, we obtain new tauberian theorems for to belong to a class which are decisive in describing the asymptotic behavior of unbounded solutions of many abstract differential-integral equations. This generalizes various recent results
Cite
@article{arxiv.1206.4749,
title = {Generalized vector valued almost periodic and ergodic distributions},
author = {Bolis Basit and Hans Günzler},
journal= {arXiv preprint arXiv:1206.4749},
year = {2012}
}
Comments
69 pages