Inhomogeneous Oscillatory Integrals and Global Smoothing Effects for Dispersive Equations
Abstract
We study oscillatory integrals of the type F-1(eita(·)(·)) where a is a general function satisfying some elliptic type and non-degenerate conditions at both the origin and infinity, and belongs to some symbol class. Point-wise estimates in space-time are gained with partial sharpness. As applications, global smoothing effects of Lp-Lq as well as Strichartz type for dispersive equations are studied. An application to fractional Schr\"odinger equations is also given.
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