Journal of Symplectic Geometry

Volume 14 (2016)

Number 2

Quantization of Planck’s constant

Pages: 587 – 655



Eli Hawkins (Department of Mathematics, The University of York, Heslington, York, United Kingdom)


This paper is about the role of Planck’s constant, $\hbar$, in the geometric quantization of Poisson manifolds using symplectic groupoids. In order to construct a strict deformation quantization of a given Poisson manifold, one can use all possible rescalings of the Poisson structure, which can be combined into a single “Heisenberg–Poisson” manifold. The new coordinate on this manifold is identified with $\hbar$. I present an explicit construction for a symplectic groupoid integrating a Heisenberg–Poisson manifold and discuss its geometric quantization. I show that in cases where $\hbar$ cannot take arbitrary values, this is enforced by Bohr–Sommerfeld conditions in geometric quantization.

A Heisenberg–Poisson manifold is defined by linearly rescaling the Poisson structure, so I also discuss nonlinear variations and give an example of quantization of a nonintegrable Poisson manifold using a presymplectic groupoid.

In appendices, I construct symplectic groupoids integrating a more general class of Heisenberg–Poisson manifolds constructed from Jacobi manifolds and discuss the parabolic tangent groupoid.

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