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Characterization of embeddings of Sobolev-type spaces into generalized Hölder spaces defined by $L_p$-modulus of smoothness

Publication at Faculty of Mathematics and Physics |
2019

Abstract

We prove a sharp estimate for the $k$-modulus of smoothness, modelled upon a~\mbox{$p$-Lebesgue} space, of a function $f$ in $ W^kL^{\frac{pn}{n+kp},p}(\Omega)+W^kL^p(\Omega)$, where $\Omega$ is a domain with minimally smooth boundary and finite Lebesgue measure. This sharp estimate is used to establish necessary and sufficient conditions for continuous embeddings of Sobolev-type spaces into generalized H\"older spaces defined by means of the $k$-modulus of smoothness.

General results are illustrated with examples. In particular, we obtain a generalization of the classical Jawerth embeddings.