中文

Index and Dynamics of Quantized Contact Transformations

数学物理 2007-05-23 v1 math.MP

摘要

Quantized contact transformations are Toeplitz operators over a contact manifold (X,α)(X,\alpha) of the form Uχ=ΠAχΠU_{\chi} = \Pi A \chi \Pi, where Π:H2(X)L2(X)\Pi : H^2(X) \to L^2(X) is a Szego projector, where χ\chi is a contact transformation and where AA is a pseudodifferential operator over XX. They provide a flexible alternative to the Kahler quantization of symplectic maps, and encompass many of the examples in the physics literature, e.g. quantized cat maps and kicked rotors. The index problem is to determine ind(Uχ)ind(U_{\chi}) when the principal symbol is unitary, or equivalently to determine whether AA can be chosen so that UχU_{\chi} is unitary. We show that the answer is yes in the case of quantized symplectic torus automorphisms gg---by showing that UgU_g duplicates the classical transformation laws on theta functions. Using the Cauchy-Szego kernel on the Heisenberg group, we calculate the traces on theta functions of each degree N. We also study the quantum dynamics generated by a general q.c.t. UχU_{\chi}, i.e. the quasi-classical asymptotics of the eigenvalues and eigenfunctions under various ergodicity and mixing hypotheses on χ.\chi. Our principal results are proofs of equidistribution of eigenfunctions ϕNj\phi_{Nj} and weak mixing properties of matrix elements (BϕNi,ϕNj)(B\phi_{Ni}, \phi_{Nj}) for quantizations of mixing symplectic maps.

引用

@article{arxiv.math-ph/0002007,
  title  = {Index and Dynamics of Quantized Contact Transformations},
  author = {Steve Zelditch},
  journal= {arXiv preprint arXiv:math-ph/0002007},
  year   = {2007}
}