Non-concentration of quasimodes for integrable systems

Abstract

We consider the possible concentration in phase space of a sequence of eigenfunctions (or, more generally, a quasimode) of an operator whose principal symbol has completely integrable Hamilton flow. The semiclassical wavefront set WFh of such a sequence is invariant under the Hamilton flow. In principle this may allow concentration of WFh along positive codimension sub-tori of a Liouville torus L if there exist rational relations among the frequencies of the flow on L. We show that, subject to non-degeneracy hypotheses, this concentration may not in fact occur. The main tools are the spreading of Lagrangian regularity on L previously shown by Vasy and the author, and an analysis of higher order transport equations satisfied by the principal symbol of a Lagrangian quasimode.