The Hardy spaces HpFIO(Rn) for Fourier integral operators for p<1
Abstract
We introduce the Hardy spaces HpFIO(Rn) for Fourier integral operators for 0<p<1, thereby extending earlier constructions for 1≤ p≤ ∞. We then establish various properties of these spaces, including their behavior under complex interpolation and duality, and their invariance under Fourier integral operators. We also obtain Sobolev embeddings, equivalent characterizations, and a molecular decomposition. These spaces are used in the companion article arXiv:2502.02511 to determine the sharp H1(Rn) and bmo(Rn) regularity of wave equations with rough coefficients.
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