Boundedness of Fourier integral operators on classical function spaces
Abstract
We investigate the global boundedness of Fourier integral operators with amplitudes in the general H\"ormander classes Sm, δ(Rn), , δ∈ [0,1] and non-degenerate phase functions of arbitrary rank ∈ \0,1,…, n-1\ on Besov-Lipschitz Bsp,q(Rn) and Triebel-Lizorkin Fsp,q(Rn) of order s and 0<p≤∞, 0<q≤∞. The results that are obtained are all up to the end-point and sharp and are also applied to the regularity of Klein-Gordon-type oscillatory integrals in the aforementioned function spaces.
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