Hardy-Littlewood inequality and Lp-Lq Fourier multipliers on compact hypergroups

Abstract

This paper deals with the inequalities devoted to the comparison between the norm of a function on a compact hypergroup and the norm of its Fourier coefficients. We prove the classical Paley inequality in the setting of compact hypergroups which further gives the Hardy-Littlewood and Hausdorff-Young-Paley (Pitt) inequalities in the noncommutative context. We establish H\"ormander's Lp-Lq Fourier multiplier theorem on compact hypergroups for 1<p ≤ 2 ≤ q<∞ as an application of Hausdorff-Young-Paley inequality. We examine our results for the hypergroups constructed from the conjugacy classes of compact Lie groups and for a class of countable compact hypergroups.