Metrical almost periodicity: Levitan and Bebutov concepts

Abstract

In this paper, we analyze Levitan and Bebutov metrical approximations of functions F : × X → Y by trigonometric polynomials and -periodic type functions, where ≠ ⊂eq Rn, X and Y are complex Banach spaces, and is a general binary relation on Y. We also analyze various classes of multi-dimensional Levitan almost periodic functions in general metric and multi-dimensional Bebutov uniformly recurrent functions in general metric. We provide several applications of our theoretical results to the abstract Volterra integro-differential equations and the partial differential equations.