Off-singularity bounds and Hardy spaces for Fourier integral operators

Abstract

We define a scale of Hardy spaces HpFIO(Rn), p∈[1,∞], that are invariant under suitable Fourier integral operators of order zero. This builds on work by Smith for p=1. We also introduce a notion of off-singularity decay for kernels on the cosphere bundle of Rn, and we combine this with wave packet transforms and tent spaces over the cosphere bundle to develop a full Hardy space theory for oscillatory integral operators. In the process we extend the known results about Lp-boundedness of Fourier integral operators, from local boundedness to global boundedness for a larger class of symbols.