Geometric Quantization by Paths Part II: The General Case

Abstract

In Part I, we established the construction of the Prequantum Groupoid for simply connected spaces. This second part extends the theory to arbitrary connected parasymplectic diffeological spaces (X, ω). We identify the obstruction to the existence of the Prequantum Groupoid as the non-additivity of the integration of the prequantum form Kω on the space of loops. By defining a Total Group of Periods Pω directly on the space of paths, which absorbs the periods arising from the algebraic relations of the fundamental group, we construct a Prequantum Groupoid Tω with connected isotropy isomorphic to the torus of periods Tω = R/Pω. Furthermore, we propose that this groupoid Tω constitutes the Quantum System itself. The classical space X is embedded as the Skeleton of units, surrounded by a Quantum Fog of non-identity morphisms. We prove that the group of automorphisms of the Quantum System is isomorphic to the group of symmetries of the Dynamical System, Diff(X, ω).

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