Unimodular bilinear Fourier multipliers on Lp spaces

Abstract

In this paper we investigate the boundedness properties of bilinear multiplier operators associated with unimodular functions of the form m(,η)=ei φ(-η). We prove that if φ is a C1( Rn) real-valued non-linear function, then for all exponents p,q,r lying outside the local L2-range and satisfying the H\"older's condition 1p+1q=1r, the bilinear multiplier norm \|eiλ φ(-η)\| Mp,q,r( Rn)→ ∞,~ λ ∈ R,~ |λ|→ ∞. For exponents in the local L2-range, we give examples of unimodular functions of the form eiφ(-η), which do not give rise to bilinear multipliers. Further, we also discuss the essential continuity property of bilinear multipliers for exponents outside local L2- range.