Dynamics of radial threshold solutions for generalized energy-critical Hartree equation

Abstract

In this paper, we study long time dynamics of radial threshold solutions for the focusing, generalized energy-critical Hartree equation and classify all radial threshold solutions. The main arguments are the spectral theory of the linearized operator, the modulational analysis and the concentration compactness rigidity argument developed by T. Duyckaerts and F. Merle to classify all threshold solutions for the energy critical NLS and NLW in DuyMerle:NLS:ThresholdSolution, DuyMerle:NLW:ThresholdSolution, later by D. Li and X. Zhang in LiZh:NLS, LiZh:NLW in higher dimensions. The new ingredient here is to solve the nondegeneracy of positive bubble solutions with nonlocal structure in H1(N) (i.e. the spectral assumption in MiaoWX:dynamic gHartree) by the nondegeneracy result of positive bubble solution in L∞(N) in LLTX:Nondegeneracy and the Moser iteration method in DiMeVald:book, which is related to the spectral analysis of the linearized operator with nonlocal structure, and plays a key role in the construction of the special threshold solutions, and the classification of all threshold solutions.

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