Boundary behavior of holomorphic functions in the ball (Q1061907)

A description of the boundary behavior of functions belonging to certain Sobolev classes of holomorphic functions on the unit ball \(B_ n\) of \({\mathbb{C}}^ n\) is given in terms of bounded and vanishing mean oscillation. In particular, it is shown that the boundary values of any holomorphic function on \(B_ n\), whose fractional derivative of order n/p belongs to the Hardy class \(H^ p(B_ n)\), have vanishing mean oscillation provided \(0<p\leq 2\).