Runge-Type Approximation Theorem for Banach-valued ${\mathbf H^\infty}$ Functions on a Polydisk
Abstract
Let be the open unit polydisk, be an -ary Cartesian product of planar sets, and be an open neighbourhood of the closure of in , where is the maximal ideal space of the algebra of bounded holomorphic functions on . Let be a complex Banach space and be the space of bounded -valued holomorphic functions on an open set . We prove that any , where , can be uniformly approximated on by ratios , where and is the product of interpolating Blaschke products such that . Moreover, if is contained in a compact holomorphically convex subset of , then above can be replaced by for any . The results follow from a new constructive Runge-type approximation theorem for Banach-valued holomorphic functions on open subsets of and extend the fundamental results of Su\'{a}rez on Runge-type approximation for analytic germs on compact subsets of . They can also be applied to the long-standing corona problem which asks whether is dense in the maximal ideal space of for all .
Cite
@article{arxiv.2401.17614,
title = {Runge-Type Approximation Theorem for Banach-valued ${\mathbf H^\infty}$ Functions on a Polydisk},
author = {Alexander Brudnyi},
journal= {arXiv preprint arXiv:2401.17614},
year = {2024}
}
Comments
23 pages; under review