Lower bounds for Maass forms on semisimple groups
Abstract
Let G be an anisotropic semisimple group over a totally real number field F. Suppose that G is compact at all but one infinite place v0. In addition, suppose that Gv0 is R-almost simple, not split, and has a Cartan involution defined over F. If Y is a congruence arithmetic manifold of non-positive curvature associated to G, we prove that there exists a sequence of Laplace eigenfunctions on Y whose sup norms grow like a power of the eigenvalue.
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