Geometric quantization of $b$-symplectic manifolds

We introduce a method of geometric quantization for compact $b$‑symplectic manifolds in terms of the index of an Atiyah–Patodi–Singer (APS) boundary value problem. We show further that $b$‑symplectic manifolds have canonical $\operatorname{Spin}$‑$c$ structures in the usual sense, and that the APS index above coincides with the index of the $\operatorname{Spin}$‑$c$ Dirac operator. We show that if the manifold is endowed with a Hamiltonian action of a compact connected Lie group with non-zero modular weights, then this method satisfies the Guillemin–Sternberg “quantization commutes with reduction” property. In particular our quantization coincides with the formal quantization defined by Guillemin, Miranda and Weitsman, providing a positive answer to a question posed in their paper.

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Received 9 January 2020

Accepted 31 July 2020

Published 26 March 2021