Shifted wave equation on noncompact symmetric spaces
Abstract
Let G be a semisimple, connected, and noncompact Lie group with a finite center. We carry out a detailed analysis of oscillating integrals involving the Harish-Chandra c-function, in the case of real rank l 2. This allows to obtain two main applications. Consider the Laplace-Beltrami operator on the homogeneous space G/K=S by a maximal compact subgroup K. We obtain pointwise estimates for the kernel of an oscillating function ( it|x|) (|x|) applied to the shifted Laplacian +||2. We obtain a polynomial decay in time of the kernel, and of the Lp-Lq norms of the operator, for 1 p<2<q ∞. For the related distinguished Laplacian, we obtain bounds for the Lp-Lp norms, 1 p∞, with a slower growth in time than predicted by earlier results.
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