English

Geometric Quantization by Paths -- Part I: The Simply Connected Case

Mathematical Physics 2025-08-18 v1 math.MP

Abstract

For any connected and simply connected parasymplectic space (X,ω)(\mathrm{X},\omega) with group of periods PωR\mathrm{P}_\omega \subsetneq \mathbf{R}, we construct a prequantum groupoid Tω\pmb{\mathrm{T}}_\omega as a diffeological quotient of the space Paths(X)\mathrm{Paths}(\mathrm{X}) of paths in X\mathrm{X}. This object, built from the geometry of the classical system, serves as a unified structure for prequantization. The groupoid Tω\pmb{\mathrm{T}}_\omega has X\mathrm{X} as its objects, and its space of morphisms Y\mathcal{Y} carries a canonical left-right invariant 11-form λ\pmb{\lambda} whose curvature encodes ω\omega. A key property is that the isotropy group Tω,x\pmb{\mathrm{T}}_{\omega,x} at any point xx, naturally arising as a quotient of the space of loops, is isomorphic to the torus of periods Tω=R/Pω\mathrm{T}_\omega = \mathbf{R}/\mathrm{P}_\omega. Furthermore, the entire symmetry group Diff(X,ω)\mathrm{Diff}(\mathrm{X}, \omega) acts as faithful automorphisms of (Tω,λ)(\pmb{\mathrm{T}}_\omega, \pmb{\lambda}) without central extensions at this level. Built within the framework of diffeology, this construction generalizes classical prequantization by applying to broad classes of spaces, including those with singularities or infinite-dimensional aspects, and by accommodating generalized (e.g., irrational) tori of periods. This paper focuses on the simply connected case; the construction will be extended to general diffeological spaces in a subsequent publication.

Keywords

Cite

@article{arxiv.2508.11337,
  title  = {Geometric Quantization by Paths -- Part I: The Simply Connected Case},
  author = {Patrick Iglesias-Zemmour},
  journal= {arXiv preprint arXiv:2508.11337},
  year   = {2025}
}

Comments

45 pages, 2 figures. A path-based definition of Geometric Quantization in a research for a link with Feynman quantization approach (the first part of a two-parts paper). Keywords: Diffeology, Geometric Quantization, Prequantum Groupoid, Closed 2-forms, Parasymplectic Spaces, Paths, Loops, Singular Spaces

R2 v1 2026-07-01T04:51:26.906Z