English

Generalized vector valued almost periodic and ergodic distributions

Functional Analysis 2012-06-22 v1

Abstract

For \CalALloc1(J,X)\Cal A\subset L^1_{loc}(\Bbb J,X) let \CalM\CalA\Cal M\Cal A consist of all fLloc1f\in L^1_{loc} with Mhf():=1h0hf(+s)ds\CalA M_h f (\cdot):=\frac {1}{h}\int_{0}^{h}f(\cdot +s)\,ds \in \Cal A for all h>0h>0. Here XX is a Banach space, J=(α,),[α,)\Bbb J= (\alpha ,\infty), [\alpha ,\infty) or R\Bbb R. Usually \CalA\CalM\CalA\CalM2\CalA...\Cal A\subset\Cal M\Cal A\subset \Cal M^2\Cal A\subset .... The map \CalA\CalD\CalA \Cal A \to \Cal {D}'_{\Cal A} is iteration complete, that is \CalD\CalD\CalA=\CalD\CalA \Cal {D}'_{\Cal {D}'_{\Cal A}}= \Cal {D}'_{\Cal A}. Under suitable assumptions \CalM~n\CalA=\CalA+{T(n):T\CalA}\widetilde {\Cal M}^n \Cal {A}= \Cal A + \{T^{(n)} : T \in \Cal A\}, and similarly for \CalMn\CalA\Cal {M}^n \Cal A. Almost periodic XX-valued distributions \h\A\h'_{\A} with \A=\A = 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 \CalD\CalE \Cal {D}'_{\Cal E} , \CalE \Cal E the class of ergodic functions, a mean can be constructed which gives Fourier series. Special cases of \CalA\Cal A are the Bohr ap, Stepanoff ap, almost automorphic, asymptotically ap, Eberlein weakly ap, pseudo ap and (totally) ergodic functions (\T)\E(\T)\E. Then always \CalMn\CalA\Cal {M}^n \Cal A is strictly contained in \CalMn+1\CalA \Cal {M}^{n+1} \Cal A. The relations between \mn\E\m^n \E, \mn\T\E\m^n\T\E and subclasses are discussed. For many of the above results a new (Δ)(\Delta)-condition is needed, we show that it holds for most of the \A\A needed in applications. Also, we obtain new tauberian theorems for fLloc1(J,X)f\in L^1_{loc}(\Bbb J,X) to belong to a class \A\A which are decisive in describing the asymptotic behavior of unbounded solutions of many abstract differential-integral equations. This generalizes various recent results

Keywords

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

R2 v1 2026-06-21T21:23:03.366Z