Lp-Lq Fourier multipliers on locally compact quantum groups

Abstract

Let G be a locally compact quantum group with dual G. Suppose that the left Haar weight and the dual left Haar weight are tracial, e.g. G is a unimodular Kac algebra. We prove that for 1<p 2 q<∞, the Fourier multiplier mx is bounded from Lp(G,) to Lq(G,) whenever the symbol x lies in Lr,∞(G,), where 1/r=1/p-1/q. Moreover, we have equation* \|mx:Lp(G,) Lq(G,)\| cp,q \|x\|Lr,∞(G,), equation* where cp,q is a constant depending only on p and q. This was first proved by H\"ormander Hormander1960 for Rn, and was recently extended to more general groups and quantum groups. Our work covers all these results and the proof is simpler. In particular, this also yields a family of Lp-Fourier multipliers over discrete group von Neumann algebras. A similar result for Sp-Sq Schur multipliers is also proved.