Fourier multipliers on weighted Lp spaces

Abstract

The paper provides a complement to the classical results on Fourier multipliers on Lp spaces. In particular, we prove that if q∈ (1,2) and a function m:R → C is of bounded q-variation uniformly on the dyadic intervals in R, i.e. m∈ Vq(D), then m is a Fourier multiplier on Lp(R, wdx) for every p≥ q and every weight w satisfying Muckenhoupt's Ap/q-condition. We also obtain a higher dimensional counterpart of this result as well as of a result by E. Berkson and T.A. Gillespie including the case of the Vq(D) spaces with q>2. New weighted estimates for modified Littlewood-Paley functions are also provided.