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Webpage by: Tomasz Golinski
| XXXVIII Workshop on Geometric Methods in Physics | 30.06-6.07.2019 |
| VIII School on Geometry and Physics | 24-28.06.2019 |
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Stephen B. SontzCoherent States for a Toeplitz Quantization of the Manin PlaneIn the theory of Toeplitz quantization of algebras coherent states are defined as eigenvectors of a Toeplitz annihilation operator. These coherent states are studied in the case when the algebra is the generically non-commutative Manin plane. We introduce the resolution of the identity, upper and lower symbols as well as a coherent state quantization, which in turn quantizes the Toeplitz quantization. We thereby have a curious combination of quantization schemes which might be a novelty. We proceed by identifying a generalized Segal–Bargmann space $ \mathcal{SB} $ of square-integrable, anti-holomorphic functions as the image of a coherent state transform. Then $ \mathcal{SB} $ has a reproducing kernel function which allows us to define a secondary Toeplitz quantization, whose symbols are functions. |
| Event sponsored by: | |||||
| University of Bialystok |
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