Comparison of spectra of absolutely regular distributions and applications

Abstract

We study the reduced Beurling spectra sp A,V (F) of functions F ∈ L1loc (,X) relative to certain function spaces A L∞(,X) and V L1 () and compare them with other spectra including the weak Laplace spectrum. Here is + or and X is a Banach space. If F belongs to the space 'ar(,X) of absolutely regular distributions and has uniformly continuous indefinite integral with 0∈ sp,() (F) (for example if F is slowly oscillating and is \0\ or C0 (,X)), then F is ergodic. If F∈ 'ar(,X) and Mh F (·)= ∫0h F(·+s)\,ds is bounded for all h > 0 (for example if F is ergodic) and if spC0(,X), (F)=, then F* ∈ C0(,X) for all ∈ (). We show that tauberian theorems for Laplace transforms follow from results about reduced spectra. Our results are more general than previous ones and we demonstrate this through examples