Bounded holomorphic functions attaining their norms in the bidual

Abstract

Under certain hypotheses on the Banach space X, we prove that the set of analytic functions in Au(X) (the algebra of all holomorphic and uniformly continuous functions in the ball of X) whose Aron-Berner extensions attain their norms, is dense in Au(X). The result holds also for functions with values in a dual space or in a Banach space with the so-called property (β). For this, we establish first a Lindenstrauss type theorem for continuous polynomials. We also present some counterexamples for the Bishop-Phelps theorem in the analytic and polynomial cases where our results apply.