L p-L q regularity of Fourier integral operators with caustics

Abstract

The caustics of Fourier integral operators are defined as caustics of the corresponding Schwartz kernels (Lagrangian distributions on X× Y). The caustic set (C) of the canonical relation C is characterized as the set of points where the rank of the projection π:C X× Y is smaller than its maximal value, dim(X× Y)-1. We derive the L p(Y) L q(X) estimates on Fourier integral operators with caustics of corank 1 (such as caustics of type Am+1, m∈). For the values of p and q outside of certain neighborhood of the line of duality, q=p', the L p L q estimates are proved to be caustics-insensitive. We apply our results to the analysis of the blow-up of the estimates on the half-wave operator just before the geodesic flow forms caustics.

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