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Invariant Gibbs measure and global strong solutions for the Hartree NLS equation in dimension three

Yu Deng, Andrea R. Nahmod, Haitian Yue

2021Journal of Mathematical Physics15 citationsDOIOpen Access PDF

Abstract

In this paper, we consider the defocusing Hartree nonlinear Schrödinger equations on T3 with real-valued and even potential V and Fourier multiplier decaying such as |k|−β. By relying on the method of random averaging operators [Deng et al., arXiv:1910.08492 (2019)], we show that there exists β0, which is less than but close to 1, such that for β > β0, we have invariance of the associated Gibbs measure and global existence of strong solutions in its statistical ensemble. In this way, we extend Bourgain’s seminal result [J. Bourgain, J. Math. Pures Appl. 76, 649–702 (1997)], which requires β > 2 in this case.

Topics & Concepts

Multiplier (economics)Gibbs measureHartreeMathematicsMeasure (data warehouse)Dimension (graph theory)Invariant (physics)Nonlinear systemMathematical physicsFourier transformMathematical analysisInvariant measureFourier analysisPhysicsPotential theoryMeasurable functionOperator theoryLarge deviations theoryStatistical physicsStatistical ensembleAdvanced Mathematical Physics ProblemsGas Dynamics and Kinetic TheoryNonlinear Partial Differential Equations
Invariant Gibbs measure and global strong solutions for the Hartree NLS equation in dimension three | Litcius