Corona theorem and isometries

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Corona theorem and isometries

Krzysztof Rudol-2004-01-01-SHILAP Revista de lepidopterología

2

TL;DRAbstract

The aim of this note is to discuss a new operator theory approach to Corona Problem. An equivalent operator problem invariant under unitary equivalence is stated. The related condition involves certain joint spectra of commuting subnormal operators. A special case leading to isometries is studied. As a result one obtains a relatively short proof of Corona Theorem for a wide class of domains in the plane, where Marshall's Theorem on the approximation by inner functions holds.

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The aim of this note is to discuss a new operator theory approach to Corona Problem. An equivalent operator problem invariant under unitary equivalence is stated. The related condition involves certain joint spectra of commuting subnormal operators. A special case leading to isometries is studied. As a result one obtains a relatively short proof of Corona Theorem for a wide class of domains in the plane, where Marshall's Theorem on the approximation by inner functions holds.

Keywords

MathematicsInvariant (physics)Equivalence (formal languages)Operator (biology)Pure mathematicsUnitary stateMathematical analysisMathematical physics

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