Partially Localized Quasimodes in Large Subspaces

Abstract

We consider spaces of high-energy quasimodes for the Laplacian on a compact hyperbolic surface, and show that when the spaces are large enough, one can find quasimodes that exhibit strong localization phenomena. Namely, take any constant c, and a sequence of (crj)-dimensional spaces Sj of quasimodes, where 1/4+rj2 is an approximate eigenvalue for Sj. Then we can find a vector psij in each Sj, such that any weak-* limit point of the microlocal lifts of |psij|2 localizes a positive proportion of its mass on a singular set of codimension 1. This result is sharp, in light of recent joint work with E. Lindenstrauss, proving QUE for certain joint quasimodes that include spaces of size o(rj) with arbitrarily slow decay.