Gains of integrability and local smoothing effects for quadratic evolution equations

Abstract

We characterize geometrically the semigroups generated by non-selfadjoint quadratic differential operators (e-tqw)t≥ 0 enjoying local smoothing effects and providing gains of integrability. More precisely, we prove that the evolution operators e-tqw map Lp on Lq C∞, for all 1≤ p ≤ q ≤ ∞, if and only if the singular space of the quadratic operator qw is included in the graph of a linear map. We also provide quantitative estimates for the associated operator norms in the short-time asymptotics 0<t 1.