English

Enhanced Quantization: The Right way to Quantize Everything

Quantum Physics 2017-05-26 v2 High Energy Physics - Theory Mathematical Physics math.MP History and Philosophy of Physics

Abstract

Canonical quantization relies on Cartesian, canonical, phase-space coordinates to promote to Hermitian operators, which also become the principal ingredients in the quantum Hamiltonian. While generally appropriate, this procedure can also fail, e.g., for covariant, quartic, scalar fields in five-and-more spacetime dimensions (and possibly four spacetime dimensions as well), which become trivial; such failures are normally blamed on the `problem' rather than on the 'quantization procedure'. In Enhanced Quantization the association of cc-numbers to qq-numbers is chosen very differently such that: (i) there is no need to seek classical, Cartesian, phase-space coordinates; (ii) every classical, contact transformation is applicable and no change of the quantum operators arises; (iii) a new understanding of the importance of 'Cartesian coordinates' is established; and (iv) although discussed elsewhere in detail, the procedures of enhanced quantization offer fully acceptable solutions yielding non-trivial results for quartic scalar fields in four-and-more spacetime dimensions. In early sections, this paper offers a wide-audience approach to the basic principles of Enhanced Quantization using simple examples; later, several significant examples are cited for a deeper understanding. An historical note concludes the paper.

Keywords

Cite

@article{arxiv.1702.04713,
  title  = {Enhanced Quantization: The Right way to Quantize Everything},
  author = {John R. Klauder},
  journal= {arXiv preprint arXiv:1702.04713},
  year   = {2017}
}

Comments

18 pages, contribution to conference proceedings, version approved by referee

R2 v1 2026-06-22T18:19:28.724Z