Extension by zero of functions in spaces with generalized smoothness for degenerate domains (Q2714729)

The aim of the paper is to find conditions (on generalized smoothness functions and a domain) which guarantee that the extension by zero operator \(T_0\) (defined by \(T_0f(x)=f(x)\), \(x\in\Omega\), and \(T_0 f(x) = 0\), \(x\notin \Omega\)) maps the space \(W^{\lambda(\cdot)}_p(\Omega)\) continuously into \(W^{\nu(\cdot)}_p (\mathbb R^n)\). Here \(1\leq p < \infty\), \(\Omega\subset \mathbb R^n\) is a domain of class \(H^{\omega}\), \(\lambda\) and \(\nu\) are convenient generalized smoothness functions and \(W^{\lambda(\cdot)}_p (\Omega)\) and \(W^{\nu(\cdot)}_p (\mathbb R^n)\) the corresponding Sobolev spaces.NEWLINENEWLINEFor the entire collection see [Zbl 0952.00006].