Extension problem for functions with values in a Clifford algebra (Q754007)

This paper deals with an extension problem for regular functions with values in a Clifford algebra. Let \(G\subset {\mathbb{R}}^ m\) be a domain of the form \(G=G_ 1\times G_ 2\), \(G_ 1\subset {\mathbb{R}}^ p(x_ 1,...,x_ p)\), \(G_ 2\subset {\mathbb{R}}^{m-p}(x_{p+1},...,x_ m)\), \(0<p<m\). Let \(\Sigma\) be an open connected neighbourhood of \(\partial G\). It is proved that a function f(x) which is regular in \(\Sigma\) as well as regular with respect to \((x_ 1,...,x_ p)\) in \(\Sigma\) can be extended continuously to a regular function in the whole of G. In addition an application of this extension theorem is presented.