On Shilov boundary and Gelfand spectrum of algebras of generalized analytic functions
Abstract
Let S be a discrete abelian semigroup with unit and concellations and S the semigroup of semicharacters of S. We shaw that the strong boundary and the Shilov boundary of the algebra of generalized analytic functions defined on S are unions of some maximal subgroups of S. We shaw also that the both boundaries coincide with the character group of S if S does not contain nontrivial simple ideals. In the last case the Gelfand spectrum of the algebra under consideration is calculated.
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