On the Defect of Compactness for the Strichartz Estimates of the Schrödinger Equations

## Abstract We study the dispersive properties of the Schrödinger equation. Precisely, we look for estimates which give a control of the local regularity and decay at infinity __separately__. The Banach spaces that allow such a treatment are the Wiener amalgam spaces, and Strichartz‐type estimates

In this paper I prove a L p &L p estimate for the solutions to the one-dimensional Schro dinger equation with a potential in L 1 # where in the generic case #>3Â2 and in the exceptional case (i.e., when there is a half-bound state of zero energy) #>5Â2. I use this estimate to construct the scatterin

We study the Whitham equations, which describe the semiclassical limit of the defocusing nonlinear Schrödinger equation. The limit is governed by a pair of hyperbolic equations of two independent variables for a short time starting from the initial time. After this hyperbolic solution breaks down, t

## Abstract We revisit the question of an invariant measure for the focusing cubic Schrödinger equation on the line. For the periodic problem the appropriate ensemble was introduced by Lebowitz, Rose, and Speer [3] and proved to be invariant under the flow by McKean [5]. These parties and others ha