ON MINIMAL KERNELS AND LEVI CURRENTS ON WEAKLY COMPLETE COMPLEX MANIFOLDS

Finally in Section 6 we investigate the boundary behavior in a fixed boundary point of a normal function defined on a convex bounded domain in a complex Banach

In particular its fundamental solution is explicitly known, and we will write in terms of it a representation formula for functions of class CL’a.. In Section

— Motivated by a renewed interest for the “additive dilogarithm” appeared recently, the purpose of this paper is to complete calculations on the tangent complex to the

The above corollary follows from (iii) of Theorem 3 and Haefliger's Theorem, which says that a real analytic manifold with finite fundamental group admits no real analytic

In this section we shall prove, using the group structure on X, that the existence of a non degenerate meromorphic function f on X implies the existence of a

Roughly speaking, the result says that a compact manifold which admits a holomorphic map onto a curve such that the fibres are balanced, is itself

The following result is not new. Rado and has certainly been known to the authors for some time. Theorem 4.1 will be an immediate consequence of the

Since E(gi) is uniformly bounded, the last number is arbitrarily small when r is small enough. If the former case occurs for all x E G, then g i is equicontinuous on G