Metrical approximations of functions
Abstract
In this paper, we analyze metrical approximations of functions F : times 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 . Besides the classical concept, we analyze Stepanov,Weyl, Besicovitch and Doss generalized approaches to metrical approximations. We clarify many structural properties of introduced spaces of functions and provide several applications of our theoretical results to the abstract Volterra integro-differential equations and the partial differential equations.
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