Classical inequalities for all Fourier matrix coefficients of SL(2,R) and their applications
Abstract
In this article, we establish three fundamental Fourier inequalities: the Hausdorff-Young inequality, the Paley inequality, and the Hausdorff-Young-Paley inequality for (l, n)-type functions on SL(2,R). Utilizing these inequalities, we demonstrate the Lp-Lq boundedness of (l, n)-type Fourier multipliers on SL(2,R). Furthermore, we explore applications related to the Lp-Lq estimates of the heat kernel of the Casimir element on SL(2,R) and address the global well-posedness of certain parabolic and hyperbolic nonlinear equations.
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