Temperedness of reductive homogeneous spaces
classification
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reductiverepresentationalgebraicalmostapplicationbestcriteriondetects
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Let G be a semisimple algebraic Lie group and H a reductive subgroup. We find geometrically the best even integer p for which the representation of G in L^2(G/H) is almost L^{p}. As an application, we give a criterion which detects whether this representation is tempered.
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