Adiabatic Limit, Theta Function, and Geometric Quantization

Abstract

Let π (M,ω) B be a non-singular Lagrangian torus fibration on a complete base B with prequantum line bundle (L,∇L) (M,ω). Compactness on M is not assumed. For a positive integer N and a compatible almost complex structure J on (M,ω) invariant along the fiber of π, let D be the associated Spinc Dirac operator with coefficients in L N. First, in the case where J is integrable, under certain technical condition on J, we give a complete orthogonal system \ b\b∈ B BS of the space of holomorphic L2-sections of L N indexed by the Bohr-Sommerfeld points B BS such that each b converges to a delta-function section supported on the corresponding Bohr-Sommerfeld fiber π-1(b) by the adiabatic(-type) limit. We also explain the relation of b with Jacobi's theta functions when (M,ω) is T2n. Second, in the case where J is not integrable, we give an orthogonal family \ b\b∈ B BS of L2-sections of L N indexed by B BS which has the same property as above, and show that each D b converges to 0 by the adiabatic(-type) limit with respect to the L2-norm.