Interpolating sequences for Banach spaces of holomorphic functions

This work studies interpolating sequences for Banach spaces of analytic functions, such as Hardy spaces of bounded holomorphic functions on domains of N. New results are obtained on minimal sets of bounded sequences whose interpolation by functions in H^ () guarantees that a sequence is interpolating for such spaces. The first sufficient condition, in terms of the Gleason distance, is also provided for a sequence in MA X to be interpolating for a dual uniform algebra A = X^*, together with a simple characterization of interpolating sequences for those bidual uniform algebras that are regular.