Obstruction results in quantization theory

This survey is an overview of some of the better known quantization techniques (for systems with finite numbers of degrees-of-freedom) including in particular canonical quantization and the related Dirac scheme, introduced in the early days of quantum mechanics, Segal and Borel quantizations, geometric quantization, various ramifications of deformation quantization, Berezin and Berezin–Toeplitz quantizations, prime quantization and coherent state quantization. We have attempted to give an account sufficiently in depth to convey the general picture, as well as to indicate the mutual relationships between various methods, their relative successes and shortcomings, mentioning also open problems in the area. Finally, even for approaches for which lack of space or expertise prevented us from treating them to the extent they would deserve, we have tried to provide ample references to the existing literature on the subject. In all cases, we have made an effort to keep the discussion accessible both to physicists and to mathematicians, including non-specialists in the field.

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“…Also we gave up the von Neumann rule (q3), but it turns out that this is usually recovered to some extent, cf. [115].…”

Section: Geometric Quantizationmentioning

confidence: 99%

Quantization Methods: A Guide for Physicists and Analysts

2005

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“…Relations of such type appears in various quantization approaches (see e.g. [3,19]). The simplest general form of von Neumann rule is…”

Section: Appendixmentioning

confidence: 99%

“…In the paper, the problem of quantization of polynomial classical observables is studied. It is well-known that it is impossible to fully quantize the algebra of polynomials on a Euclidean phase space [1,2,3]. Consequently, research has concentrated in two main directions.…”

Section: Introductionmentioning

confidence: 99%

On quantization of polynomial momentum observables

Kalinin

1999

Reports on Mathematical Physics

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“…Having one and the same algebraic product and one and the same Lie bracket for both mechanics, we shall be able to propose, we believe, unambiguous-obstruction free, quantization prescription. (The ordering rule and obstructions to quantization were previously discussed in [12][13][14][15][16][17].) Moreover, the dynamical equations of both classical and quantum mechanics will appear to be one and the same-the operator version of the Liouville equation.…”

Section: Introductionmentioning

confidence: 96%

The Operator Formulation of Classical Mechanics and Semiclassical Limit

Prvanović

2011

Int J Theor Phys

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The algebra of polynomials in operators that represent generalized coordinate and momentum and depend on the Planck constant is defined. The Planck constant is treated as the parameter taking values between zero and some nonvanishing h 0 . For the later of these two extreme values, introduced operator algebra becomes equivalent to the algebra of observables of quantum mechanical system defined in the standard manner by operators in the Hilbert space. For the vanishing Planck constant, the generalized algebra gives the operator formulation of classical mechanics since it is equivalent to the algebra of variables of classical mechanical system defined, as usually, by functions over the phase space. In this way, the semiclassical limit of kinematical part of quantum mechanics is established through the generalized operator framework.

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Obstruction results in quantization theory

Cited by 46 publications

References 40 publications

Quantization Methods: A Guide for Physicists and Analysts

Quantization Methods: A Guide for Physicists and Analysts

On quantization of polynomial momentum observables

The Operator Formulation of Classical Mechanics and Semiclassical Limit

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