Boundaries for Gelfand transform images of Banach algebras of holomorphic functions
Abstract
Let A be a Banach algebra of bounded holomorphic functions on the open unit ball BX of a complex Banach space X. Considering the Gelfand transform image A of the Banach algebra A, which is a uniform algebra on the spectrum of A, we obtain an explicit description of the Shilov boundary for A for classical Banach spaces X in the case where A is a certain Banach algebra, for instance, A∞ (BX), Au (BX) or Awu (BX). Some possible application of our result to the famous Corona theorem is also briefly discussed.
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