Boundedness of Schroedinger type propagators on modulation spaces

Abstract

It is known that Fourier integral operators arising when solving Schr\"odinger-type operators are bounded on the modulation spaces p,q, for 1≤ p=q≤∞, provided their symbols belong to the Sj\"ostrand class M∞,1. However, they generally fail to be bounded on p,q for p=q. In this paper we study several additional conditions, to be imposed on the phase or on the symbol, which guarantee the boundedness on p,q for p=q, and between p,qq,p, 1≤ q< p≤∞. We also study similar problems for operators acting on Wiener amalgam spaces, recapturing, in particular, some recent results for metaplectic operators. Our arguments make heavily use of the uncertainty principle.