Abstract
Abstract In this paper, we study the semiclassical behavior of distorted plane waves, on manifolds that are Euclidean near infinity or hyperbolic near infinity, and of non-positive curvature. Assuming that there is a strip without resonances below the real axis, we show that distorted plane waves are bounded in $L^2_{loc}$ independently of $h$ and that they admit a unique semiclassical measure and we prove bounds on their $L^p_{loc}$ norms.
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