H\"ormander oscillatory integral operators: a revisit

Abstract

In this paper, we present new proofs for both the sharp Lp estimate and the decoupling theorem for the H\"ormander oscillatory integral operator. The sharp Lp estimate was previously obtained by Stein\;stein1 and Bourgain-Guth BG via the TT and multilinear methods, respectively. We provide a unified proof based on the bilinear method for both odd and even dimensions. The strategy is inspired by Barron's work Bar on the restriction problem. The decoupling theorem for the H\"ormander oscillatory integral operator can be obtained by the approach in BHS, where the key observation can be roughly formulated as follows: in a physical space of sufficiently small scale, the variable setting can be essentially viewed as translation-invariant. In contrast, we reprove the decoupling theorem for the H\"ormander oscillatory integral operator through the Pramanik-Seeger approximation approach PS. Both proofs rely on a scale-dependent induction argument, which can be used to deal with perturbation terms in the phase function.