Spreading of Lagrangian regularity on rational invariant tori
Abstract
Let Ph be a self-adjoint semiclassical pseudodifferential operator on a manifold M such that the bicharacteristic flow of the principal symbol on T*M is completely integrable and the subprincipal symbol of Ph vanishes. Consider a semiclassical family of eigenfunctions, or, more generally, quasimodes uh of Ph. We show that on a nondegenerate rational invariant torus, Lagrangian regularity of uh (regularity under test operators characteristic on the torus) propagates both along bicharacteristics, and also in an additional ``diffractive'' manner. In particular, in addition to propagating along null bicharacteristics, regularity fills in the interiors of small annular tubes of bicharacteristics.
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