Global harmonic analysis is concerned with the impact of global geometry, particularly the geodesic flow, on the behavior of eigenfunctions, eigenvalues and waves on a Riemannian manifold. One of the best known areas of global harmonic analysis is Quantum Chaos, which concerns the impact of ergodicity or mixing of the geodesic flow on semi-classical limits of eigenfunctions and eigenvalues. Nalini Anantharaman and I are continuing our joint work in quantum ergodicity on hyperbolic surfaces, where we are constructing an explicit intertwining operator between classical and quantum dynamics. Using the hyperbolic Poisson operator, I reduced the study of quantum limits to the ideal boundary and am studying boundary distributions of eigenfunctions. Dynamics also can be used in inverse spectral theory. Hamid Hezari and I have recently proved that any analytic domain with mirror symmetries across all axes are determined by their Dirichlet spectra. We are currently relating our results to Birkhoff normal forms. John Toth, Hans Christianson and I are also developing a new area of quantum ergodic restriction theorems, where eigenfunctions are ergodic after being restricted to hypersurfaces. In another direction, global harmonic analysis is useful in constructing approximate solutions of the complex homogeneous Monge Ampere equations governing geodesics in the space of Kahler metrics. Rubinstein and I are using complex Fourier integral operator methods to solve the Cauchy initial value problem for geodesics. With Shiffman and Zeitouni I am continuing also my work on random holomorphic fields on Kahler manifolds. This is another kind of asymptotic geometry where the number of zeros tends to infinity.

Global harmonic analysis and asymptotic geometry is the use of ideas and techniques of quantum mechanics to solve problems in geometry, analysis and mathematical physics. A famous problem is to whether one can hear the shape of a drum, i.e. tell the shape from the frequencies of vibration. One would also like to know the shapes and sizes of the modes of vibration, and the structure of the nodal sets where the drum is not moving as it vibrates. For two hundred years, the frequencies and shapes of modes of vibration have been important in physics and engineering, both for actual drums and also for atoms and molecules. It turns out that one can learn a lot about modes of vibration by playing billiards on the drum head. By looking carefully at waves moving along bouncing ball orbits (billiard trajectories which hit the domain orthogonally at two points and endlessly bounce back and forth between these points), one can determine the entire shape of an analytic drum. Morever, when the billiards are chaotic then one can determine the patterns of nodal sets, where the drum is still as it vibrates. My research gives rigorous proofs of these statements.

Project Report

I used the grant award in this period to fund a week-long workshop on Analytic Microlocal Analysis. Microlocal Analysis is the field of mathematics which makes a rigorous analysis of the relations between classical Hamiltonian dynamics and quantum mechanics. Microlocal means local in phase space, the space of positions and momenta of classical particles. Analytic Microlocal Analysis is the sub-field of Microlocal Analysis in which all of the main objects, the Hamiltonian and the phase space, are assumed to be real analytic. The basic models ranging from the Harmonic Oscillator to the Hydrogen atom are real analytic. The main point is to use complex analysis to study PDE (partial differential equations) with analytic coefficients. Analytic Microlocal Analysis reached a high stage of technical perfection in the 70's and 80's. But the leaders of the field (Sjostrand, Boutet de Monvel, Guillemin, Lebeau, etc.) did not write very good expositions of the field. The main reference remains a book of Sjostrand in French, which is written only for experts. There does not exist a good text for a course in the subject and it is hard even for researchers to learn the field. The purpose of the workshop was to assemble the leading experts and have them give mini-courses at a reasonably elementary level for grad students and post-docs. Claude Zuily, Gilles Lebeau, Michael Hitrik, Boutet de Monvel, Maciej Zworski and others gave very nice lectures explaining the field. Sjostrand declined to come at the very last moment but sent 70 pages of lecture slides, which others used in their lectures (e.g. Andre Martinez). Other experts such as Burns and Lempert in the geometry of Grauert tubes gave talks which gave geometric insight into techniques developed to analyse PDE such as the wave equation, eigenfunctions and the Monge Ampere equation. I think the workshop was quite successful in communicating both the main results and the main problems to the audience. In addition, I am editing the Proceedings with Michael Hitrik of UCLA. I have faced the problem of finding an adequate text to use in teaching a class in this subject. I believe that the Proceedings can be used as an advanced text for future courses.

Agency
National Science Foundation (NSF)
Institute
Division of Mathematical Sciences (DMS)
Application #
1058342
Program Officer
Joanna Kania-Bartoszynsk
Project Start
Project End
Budget Start
2010-02-15
Budget End
2013-06-30
Support Year
Fiscal Year
2010
Total Cost
$437,684
Indirect Cost
Name
Northwestern University at Chicago
Department
Type
DUNS #
City
Chicago
State
IL
Country
United States
Zip Code
60611