Binormal and complex symmetric weighted composition operators on the Fock space over \(\mathbb{C} \)
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Publication:6043360
DOI10.30970/ms.59.1.106-112OpenAlexW4362467863MaRDI QIDQ6043360
Publication date: 5 May 2023
Published in: Matematychni Studiï (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.30970/ms.59.1.106-112
Linear composition operators (47B33) Special classes of linear operators (47B99) Operators on complex function spaces (47B91)
Cites Work
- Invertible weighted composition operators on the Fock space of \(\mathbb{C}^N\)
- Complex symmetry of weighted composition operators on the Fock space
- Linear operators for which \(T^*T\) and \(T+T^*\) commute
- Characterizations of binormal composition operators with linear fractional symbols on \(H^{2}\)
- Unitary weighted composition operators on the Fock space of \(\mathbb C ^n\)
- Composition operators for which and commute
- ISOMETRIC WEIGHTED COMPOSITION OPERATORS ON THE FOCK SPACE OF ℂN
- Spectral Properties of Linear Operators for which T ∗ T and T + T ∗ Commute
- Linear Operators for which T ∗ T and T + T ∗ Commute. II
- Normal and isometric weighted composition operators on the Fock space
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