New results on Fourier multipliers on Lp: a perspective through unimodular symbols

Abstract

The paper focuses on the behaviour of unimodular Fourier multipliers with exponential growth in the context of weighted Lp-spaces. Our main result shows that much of the general theory of multipliers is approachable through the theory of unimodular multipliers. Indeed, we show that a bounded measurable function m is a multiplier on Lp for 1≤ p<∞ provided that eitm is a multiplier on Lp and its multiplier norm admits an exponential bound of the form ec|t|s for suitable c>0 and 0<s<1. We then apply this principle to obtain new results related to the boundedness of homogeneous rough operators, singular operators along curves and oscillatory integrals. A key ingredient in our study is an extension of the classical Stein's theorem on analytic families of operators that studies the behaviour of the derivative operator when θ 0.