Pointwise Weyl Laws for Quantum Completely Integrable Systems
Abstract
The study of the asymptotics of the spectral function for self-adjoint, elliptic differential, or more generally pseudodifferential, operators on a compact manifold has a long history. The seminal 1968 paper of H\"ormander, following important prior contributions by G\"arding, Levitan, Avakumovi\'c, and Agmon-Kannai (to name only some), obtained pointwise asymptotics (or a "pointwise Weyl law") for a single elliptic, self-adjoint operator. Here, we establish a microlocalized pointwise Weyl law for the joint spectral functions of quantum completely integrable (QCI) systems, P=(P1,P2,…, Pn), where Pi are first-order, classical, self-adjoint, pseudodifferential operators on a compact manifold Mn, with Σ Pi2 elliptic and [Pi,Pj]=0 for 1≤ i,j≤ n. A particularly important case is when (M,g) is Riemannian and P1=(-)12. We illustrate our result with several examples, including surfaces of revolution.
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