Topology of the Maximal Ideal Space of H∞
Abstract
We study the structure of the maximal ideal space M(H∞) of the algebra H∞=H∞() of bounded analytic functions defined on the open unit disk ⊂. Based on the fact that dim\ M(H∞)=2 we prove for H∞ the matrix-valued corona theorem. Our results heavily rely on the topological construction describing maximal ideal spaces of certain algebras of continuous functions defined on the covering spaces of compact manifolds.
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