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Embeddings of Sobolev-type spaces into generalized Holder spaces involving k-modulus of smoothness

Publication at Faculty of Mathematics and Physics |
2015

Abstract

We use an estimate of the k-modulus of smoothness of a function f such that the norm of its distributional gradient $|NABLA^k f|$ belongs locally to the Lorentz space$ L^{n/k,1}(R^n)$, k in N, k less or equal n, and we prove its reverse form to establish necessary and sufficient conditions for continuous embeddings of Sobolev-type spaces.