Continuous Deformations of Algebras of Holomorphic Functions on Subvarieties of a Noncommutative Ball
Abstract
We propose a general method for constructing continuous Banach bundles whose fibers are algebras of holomorphic functions on subvarieties of a closed noncommutative ball. These algebras are of the form Ad/Ix, where Ad is the noncommutative disk algebra introduced by G. Popescu, and Ix is a graded ideal in Ad, which depends continuously on the point x of the topological space X. Similarly, we construct bundles with fibers isomorphic to the algebras Fd/Ix of holomorphic functions on subvarieties of an open noncommutative ball. Here Fd is the algebra of free holomorphic functions on the unit ball, which was also introduced by G. Popescu, and Ix is a graded ideal in Fd, which depends continuously on the point x of the topological space X.
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