Lp-Lq boundedness of integral operators with oscillatory kernels: Linear versus quadratic phases

Abstract

Let \,Tj,kN:Lp(B)\, →\,Lq([0,1])\, be the oscillatory integral operators defined by \; Tj,kNf(s):=∫B \,f(x)\,e N|x|jsk\,dx, (j,k)∈\1,2\2,\, where \,B\, is the unit ball in Rn\, and \,N\,>>1. We compare the asymptotic behaviour as \,N→ +∞\, of the operator norms \, Tj,kN Lp(B)→ Lq([0,1])\, for all \,p,\,q∈ [1,+∞].\, We prove that, except for the dimension n=1,\, this asymptotic behaviour depends on the linearity or quadraticity of the phase in s only. We are led to this problem by an observation on inhomogeneous Strichartz estimates for the Schr\"odinger equation.