Quantization in mixed polarization via transverse Poincar\'e-Birkhoff-Witt theorem
Abstract
On a prequantizable K\"ahler manifold (M, ω, L), Chan-Leung-Li constructed a genuine (non-asymptotic) action of a subalgebra of the Berezin-Toeplitz star product on H0(M, L k) for each level k [14]. We extend their framework to any non-singular polarization P by developing a theory of transverse differential operators associated to P: (1) For any pair of locally free P-modules E, E', we construct a Poincar\'e-Birkhoff-Witt isomorphism for the bundle D(E, E') of transverse differential operators from E to E'. When E, E' are trivial rank-1 P-modules, this recovers the PBW theorem of Laurent-Gengoux-Sti\'enon-Xu [29] for the Lie pair (TMC, P). (2) Using these PBW isomorphisms, we show that the Grothendieck connections on the transeverse jet bundle of L k give rise to a deformation quantization (CM∞[[]], ) together with a sheaf of subalgebras CM, <∞ that acts on P-polarized sections of L k. We obtain a geometric interpretation of (CM, <∞, ) by evaluating at = -1k, yielding a sheaf Ok(<∞), and proving that Ok(<∞) DL k as sheaves of filtered algebras, where DL k is the sheaf of transverse differential operators on L k. When P is a K\"ahler polarization, this recovers the result of Chan-Leung-Li [14]. As an application, we study symplectic tori and derive asymptotic expansions for the Toeplitz-type operators in real polarization introduced in [35].
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