Runge-Type Approximation Theorem for Banach-valued H∞ Functions on a Polydisk

Abstract

Let Dn⊂ Cn be the open unit polydisk, K⊂ Dn be an n-ary Cartesian product of planar sets, and U⊂ Mn be an open neighbourhood of the closure K of K in Mn, where M is the maximal ideal space of the algebra H∞ of bounded holomorphic functions on D. Let X be a complex Banach space and H∞(V,X) be the space of bounded X-valued holomorphic functions on an open set V⊂ Dn. We prove that any f∈ H∞(U,X), where U= U Dn, can be uniformly approximated on K by ratios h/b, where h∈ H∞( Dn,X) and b is the product of interpolating Blaschke products such that ∈fK |b|>0. Moreover, if K is contained in a compact holomorphically convex subset of U, then h/b above can be replaced by h for any f. The results follow from a new constructive Runge-type approximation theorem for Banach-valued holomorphic functions on open subsets of D and extend the fundamental results of Su\'arez on Runge-type approximation for analytic germs on compact subsets of M. They can also be applied to the long-standing corona problem which asks whether Dn is dense in the maximal ideal space of H∞( Dn) for all n 2.