Uniform algebras and approximation on manifolds
Abstract
Let ⊂ Cn be a bounded domain and let A ⊂ C() be a uniform algebra generated by a set F of holomorphic and pluriharmonic functions. Under natural assumptions on and F we show that the only obstruction to A = C() is that there is a holomorphic disk D ⊂ such that all functions in F are holomorphic on D, i.e., the only obstruction is the obvious one. This generalizes work by A. Izzo. We also have a generalization of Wermer's maximality theorem to the (distinguished boundary of the) bidisk.
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