Foliations of continuous q-pseudoconcave graphs

Abstract

We show that for k = 0, 1 the graph of a continuous mapping f:D Rk×Cp, defined on a domain D in Cn×Rk, is locally foliated by complex n-dimensional submanifolds if and only if its complement is n-pseudoconvex (in the sense of Rothstein) relatively to (D×Rk)×Cp⊂ Cn×Ck×Cp.