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This article is cited in 1 scientific paper (total in 1 paper)
Research Papers
Projective free algebras of bounded holomorphic functions on infinitely connected domains
A. Brudnyi Department of Mathematics and Statistics, University of Calgary, Calgary, Alberta, Canada, T2N 1N4
Abstract:
The algebra $H^\infty(D)$ of bounded holomorphic functions on $D\subset\mathbb C$ is projective free for a wide class of infinitely connected domains. In particular, for such $D$ every rectangular left-invertible matrix with entries in $H^\infty(D)$ can be extended in this class of matrices to an invertible square matrix. This follows from a new result on the structure of the maximal ideal space of $H^\infty(D)$ asserting that its covering dimension is $2$ and the second Čech cohomology group is trivial.
Keywords:
Maximal ideal space, corona problem, projective free ring, Hermite ring, covering dimension, Čech cohomology.
Received: 14.11.2019
Citation:
A. Brudnyi, “Projective free algebras of bounded holomorphic functions on infinitely connected domains”, Algebra i Analiz, 33:4 (2021), 49–65; St. Petersburg Math. J., 33:4 (2022), 619–631
Linking options:
https://www.mathnet.ru/eng/aa1769 https://www.mathnet.ru/eng/aa/v33/i4/p49
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Abstract page: | 95 | Full-text PDF : | 7 | References: | 20 | First page: | 7 |
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