Even Fourier multipliers and martingale transforms in infinite dimensions

Abstract

In this paper we show sharp lower bounds for norms of even homogeneous Fourier multipliers in L(Lp( Rd; X)) for 1<p<∞ and for a UMD Banach space X in terms of the range of the corresponding symbol. For example, if the range contains a1,…,aN ∈ C, then the norm of the multiplier exceeds \|a1R12 + ·s + aNRN2\| L(Lp( RN; X)), where Rn is the corresponding Riesz transform. We also provide sharp upper bounds of norms of Ba\~nuelos-Bogdan type multipliers in terms of the range of the functions involved. The main tools that we exploit are A-weak differential subordination of martingales and UMDpA constants, which are introduced here.