Extending functions from isotropic Nikolskii-Besov spaces and their approximating with derivatives

Abstract

The article examines isotropic Nikolskii and Besov spaces with norms defined using Lp-averaged modulus of continuity of functions of appropriate order, instead of modulus of continuity of known order for fixed-order partial derivative functions. The author builds continuous linear mappings of such spaces of functions defined in domains of (1,…,1)-type (in a broad sense) to ordinary isotropic Nikolskii and Besov spaces in Rd that are function extension operators, thus incurring coincidence of both kinds of spaces in the said domains. It is established that every bounded domain in Rd with a Lipschitzian boundary is a (1,…,1)-type domain (in a broad sense). The article also provides weak asymptotics of approximation characteristics related to the problem of reconstruction of functions with their derivatives from function values at a given number of points, the S.B.Stechkin's problem for differential operator, and the problem of width asymptotics for isotropic Nikolskii-Besov classes in those domains.