Analytic multifunction, uniform Fréchet algebras and their extension (Q1373033)

We study first the relation between analytic multifunctions and uniform Fréchet algebras and give a generalization of \textit{Z. Slodkowski's} theorem [Trans. Am. Math. Soc. 294, 367-377 (1986; Zbl 0594.32008)] for analytic multifunctions on an open subset \(G\) of \(\mathbb{C}^n\) which can not be bounded on \(G\). Then we investigate the extensibility of analytic multifunctions across thin sets which are removable for plurisubharmonic functions and we characterize the hyperbolicity of convex domains in terms of extensibility of analytic multifunctions.