On transversally elliptic operators and the quantization of manifolds with f-structure

Abstract

An f-structure on a manifold M is an endomorphism field φ∈(M,(TM)) such that φ3+φ=0. Any f-structure φ determines an almost CR structure E1,0⊂ T M given by the +i-eigenbundle of φ. Using a compatible metric g and connection ∇ on M, we construct an odd first-order differential operator D, acting on sections of = E0,1*, whose principal symbol is of the type considered in arXiv:0810.0338. In the special case of a CR-integrable almost -structure, we show that when ∇ is the generalized Tanaka-Webster connection of Lotta and Pastore, the operator D is given by D = 2(+*), where is the tangential Cauchy-Riemann operator. We then describe two "quantizations" of manifolds with f-structure that reduce to familiar methods in symplectic geometry in the case that φ is a compatible almost complex structure, and to the contact quantization defined in F4 when φ comes from a contact metric structure. The first is an index-theoretic approach involving the operator D; for certain group actions D will be transversally elliptic, and using the results in arXiv:0810.0338, we can give a Riemann-Roch type formula for its index. The second approach uses an analogue of the polarized sections of a prequantum line bundle, with a CR structure playing the role of a complex polarization.