Rational penta-inner functions and the distinguished boundary of the pentablock
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Publication:2679102
DOI10.1007/s11785-022-01297-6OpenAlexW4308790794MaRDI QIDQ2679102
Publication date: 19 January 2023
Published in: Complex Analysis and Operator Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2203.17000
Inner functions of one complex variable (30J05) Special domains (Reinhardt, Hartogs, circular, tube, etc.) in (mathbb{C}^n) and complex manifolds (32Q02)
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Cites Work
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- Finite Blaschke products and the construction of rational \(\Gamma\)-inner functions
- The Lempert theorem and the tetrablock
- Dilations of \(\varGamma\)-contractions by solving operator equations
- The complex geometry of a domain related to \(\mu\)-synthesis
- The group of automorphisms of the pentablock
- A note on tetrablock contractions
- A commutant lifting theorem for a domain in \(\mathbb{C}^2\) and spectral interpolation
- Algebraic and geometric aspects of rational \(\Gamma\)-inner functions
- Interpolation by holomorphic maps from the disc to the tetrablock
- A Schwarz lemma for the pentablock
- Geometric properties of the pentablock
- Rational tetra-inner functions and the special variety of the tetrablock
- Rational dilation of tetrablock contractions revisited
- Geometric properties of domains related to \(\mu\)-synthesis
- A Schwarz lemma for a domain related to \(\mu\)-synthesis
- A Case of $\mu$-Synthesis as a Quadratic Semidefinite Program
- Operator Theory on Symmetrized Bidisc
- Inner functions and operator theory
- The two-by-two spectral Nevanlinna-Pick problem
- Extremal holomorphic maps and the symmetrized bidisc
- The tetrablock as a spectral set
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