Semiclassical Nonconcentration near Hyperbolic Orbits

Abstract

For a large class of semiclassical pseudodifferential operators, including Schr\"odinger operators, P (h) = -h2 g + V (x) , on compact Riemannian manifolds, we give logarithmic lower bounds on the mass of eigenfunctions outside neighbourhoods of generic closed hyperbolic orbits. More precisely we show that if A is a pseudodifferential operator which is microlocally equal to the identity near the hyperbolic orbit and microlocally zero away from the orbit, then \[ \| u \| ≤ C ((1/h)/ h) \| P (h)u \| + C (1/h) \| (I - A) u \| . \] This generalizes earlier estimates of Colin de Verdi\`ere-Parisse CVP obtained for a special case, and of Burq-Zworski BZ for real hyperbolic orbits.

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