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Interpolating
Blaschke products
Donald Eddy Marshall and Arne Stray |
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Vol. 173 (1996), No. 2, 491–499
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Abstract |
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We prove that any bounded analytic function on the unit disk 𝔻 which extends to be continuous on ∂𝔻 ∖ E, for some set E of measure 0, can be uniformly approximated by finite linear combinations of interpolating Blaschke products. |
Mathematical Subject Classification 2000
Primary: 30D50
Secondary: 30E05
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Milestones
Received: 10 August 1993
Published: 1 April 1996
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Authors |
| Donald Eddy Marshall | |
| Department of Mathematics University of Washington Seattle WA 98195 United States |
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| Arne Stray | |
| Mathematics Institute University of Bergen 5007 Bergen Norway |
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