Description:
Let Bx be the open unit ball of a complex Banach space X, and let H∞(Bx) and Au(Bx) be, respectively, the algebra of bounded holomorphic functions on Bx and the subalgebra of uniformly continuous holomorphic functions on Bx. In this paper we study the analytic structure of fibers in the spectrum of these two algebras. For the case of H∞(Bx), we prove that the fiber in M(H∞(Bc0)) over any point of the distinguished boundary of the closed unit ball Bl∞ of l∞ contains an analytic copy of Bl∞. In the case of Au(Bx) we prove that if there exists a polynomial whose restriction to the open unit ball of X is not weakly continuous at some point, then the fiber over every point of the open unit ball of the bidual contains an analytic copy of D.