Hardy-Littlewood inequalities on compact quantum groups of Kac type

Abstract

The Hardy-Littlewood inequality on T compares the Lp-norm of a function with a weighted p-norm of its Fourier coefficients. The approach has recently been studied for compact homogeneous spaces and we study a natural analogue in the framework of compact quantum groups. Especially, in the case of the reduced group C*-algebras and free quantum groups, we establish explicit Lp-p inequalities through inherent information of underlying quantum group, such as growth rate and rapid decay property. Moreover, we show sharpness of the inequalities in a large class, including C(G) with compact Lie group, Cr*(G) with polynomially growing discrete group and free quantum groups ON+, SN+.