A class of multi-parameter Fourier integral operators: endpoint Hardy space bounds

Abstract

In this paper we study a class of Fourier integral operators, whose symbols lie in the multi-parameter H\"ormander class S m( R), where ~ m=(m1,m2,…,md) is the order. We show that if in addition the phase function (x,) can be written as (x,)=Σi=1di(xi,i), and each i(xi,i) satisfies the non-degeneracy condition, then such Fourier integral operators with order ~ m=(-(n1-1)/2, -(n2-1)/2,…, -(nd-1)/2) are actually bounded from rectangular Hardy space Hrect1(R) to L1( Rn ).