Scarring of quasimodes on hyperbolic manifolds

Abstract

Let N be a compact hyperbolic manifold, M⊂ N an embedded totally geodesic submanifold, and let -2N be the semiclassical Laplace--Beltrami operator. For any >0, we explicitly construct families of quasimodes of spectral width at most || which exhibit a "strong scar" on M in that their microlocal lifts converge weakly to a probability measure which places positive weight on S*M ( S*N). An immediate corollary is that any invariant measure on S*N occurs in the ergodic decomposition of the semiclassical limit of certain quasimodes of width ||