Besov-type spaces of variable smoothness on rough domains

Abstract

The paper puts forward new Besov spaces of variable smoothness B0p,q(G,\tk\) and Blp,q,r(,\tk\) on rough domains. A~domain~G is either a~bounded Lipschitz domain in~Rn or the epigraph of a~Lipschitz function, a~domain~ is an (,δ)-domain. These spaces are shown to be the traces of the spaces B0p,q(Rn,\tk\) and Blp,q,r(Rn,\tk\) on domains G and~, respectively. The extension operator Ext1:B0p,q(G,\tk\) B0p,q(Rn,\tk\) is linear, the operator Ext2:Blp,q,r(,\tk\) Blp,q,r(Rn,\tk\) is nonlinear. As a~corollary, an exact description of the traces of 2-microlocal Besov-type spaces and weighted Besov-type spaces on rough domains is obtained.