Add to ORKG8 pagesIn this paper, we construct coherent states for each generalized Bergman space on the n-dimensional complex projective space in order to apply a coherent states quantization method. Doing so allows to define the Berezin transform for these spaces. In particular, we provide a variational formula for this transform by means of the Fubini-Study Laplace operator which reduces when n = 1 and for the lowest spherical Landau level to the well-known formula previously given by Berezin himself
We extend the construction of generalized Berezin and Berezin-Toeplitz quantization to the case of c...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
ABSTRACT. While dealing with a class of generalized Bergman spaces on the unit ball, we construct fo...
peer reviewedCoherent states are quite well known, wide-spread and extremely useful tools. In this r...
In this paper we try to formulate the Berezin quantization on projective Hilbert space P(H) and us...
Berezin-Klauder-Toeplitz (“anti-Wick”) or “coherent state” quantization of the complex plane, viewed...
For phase-space manifolds which are compact Kähler manifolds relations between the Berezin-Toeplitz ...
Using the orthonormality of the 2D-Zernike polynomials reproducing kernels, reproducing kernel Hilbe...
This paper studies the boundary behavior of the Berezin transform on the C*-algebra generated by the...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
We extend the construction of generalized Berezin and Berezin-Toeplitz quantization to the case of c...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
ABSTRACT. While dealing with a class of generalized Bergman spaces on the unit ball, we construct fo...
peer reviewedCoherent states are quite well known, wide-spread and extremely useful tools. In this r...
In this paper we try to formulate the Berezin quantization on projective Hilbert space P(H) and us...
Berezin-Klauder-Toeplitz (“anti-Wick”) or “coherent state” quantization of the complex plane, viewed...
For phase-space manifolds which are compact Kähler manifolds relations between the Berezin-Toeplitz ...
Using the orthonormality of the 2D-Zernike polynomials reproducing kernels, reproducing kernel Hilbe...
This paper studies the boundary behavior of the Berezin transform on the C*-algebra generated by the...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
Coherent states are special types of wavefunctions that minimize a generalized uncertainty principle...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
We extend the construction of generalized Berezin and Berezin-Toeplitz quantization to the case of c...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...
By using a coherent state quantization à la Klauder-Berezin, phase operators are constructed in fini...