Lp-boundedness of multi-parameter Fourier integral operators

Abstract

We study a specific class of Fourier integral operators characterized by symbols belonging to the multi-parameter H\"ormander class Sm( n1 × n2 × ·s × nd ), where n= n1 + n2 +·s + nd. Our investigation focuses on cases where the phase function (x,) can be decomposed into a sum of individual components i(xi,i), with each component satisfying a non-degeneracy condition. We extend the Seeger-Sogge-Stein theorem under the condition that the dimension ni 2 for each 1 i d. As a corollary, we obtain the boundedness of multi-parameter Fourier integral operators on local Hardy spaces, Lipschitz spaces, and Sobolev spaces.