Absence of principal eigenvalues for higher rank locally symmetric spaces
Abstract
Given a geometrically finite hyperbolic surface of infinite volume it is a classical result of Patterson that the positive Laplace-Beltrami operator has no L2-eigenvalues ≥ 1/4. In this article we prove a generalization of this result for the joint L2-eigenvalues of the algebra of commuting differential operators on Riemannian locally symmetric spaces G/K of higher rank. We derive dynamical assumptions on the -action on the geodesic and the Satake compactifications which imply the absence of the corresponding principal eigenvalues. A large class of examples fulfilling these assumptions are the non-compact quotients by Anosov subgroups.
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