A remark on the log-Sobolev inequality for the Gibbs measure of the focusing Schr\"odinger equation

Abstract

We consider the question of showing a log-Sobolev inequality for the Gibbs measure of the focusing Schr\"odinger equation built by Lebowitz-Rose-Speer (1988), formally given by d ( 1 p∫ T |u|p d x - 12∫ T |∇ u|2 d x - 12∫ T |u|2 d x) 1\| u \|L2( T)2 Kdudu. When 2 p 4, we show that these measures indeed satisfy a log-Sobolev inequality. When p> 4, we show a lower bound for the Hessian of the potential, which implies that the known techniques to show these inequalities cannot apply to the measure .

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