Geometric Quantization by Paths -- Part I: The Simply Connected Case
Abstract
For any connected and simply connected parasymplectic space with group of periods , we construct a prequantum groupoid as a diffeological quotient of the space of paths in . This object, built from the geometry of the classical system, serves as a unified structure for prequantization. The groupoid has as its objects, and its space of morphisms carries a canonical left-right invariant -form whose curvature encodes . A key property is that the isotropy group at any point , naturally arising as a quotient of the space of loops, is isomorphic to the torus of periods . Furthermore, the entire symmetry group acts as faithful automorphisms of 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