On the geometry of prequantization spaces
Abstract
Given a Poisson (or more generally Dirac) manifold P, there are two approaches to its geometric quantization: one involves a circle bundle Q over P endowed with a Jacobi (or Jacobi-Dirac) structure; the other one involves a circle bundle with a (pre-) contact groupoid structure over the (pre-) symplectic groupoid of P. We study the relation between these two prequantization spaces. We show that the circle bundle over the (pre-) symplectic groupoid of P is obtained from the groupoid of Q via an S1 reduction that preserves both the groupoid and the geometric structure.
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