Symmetry and uniqueness of the positive solution for the critical Hartree equation on the Heisenberg group

Abstract

We apply the moving plane method in integral forms to classify the positive solutions of the critical Hartree equation on Heisenberg group equation0.1 -Hu=(∫Hn|u()|Qμ|ζ-1|μd)|u|Qμ-2u,~~~ζ,∈Hn, equation where H denotes the Kohn Laplacian, u() is a real-valued function, Q=2n+2 is the homogeneous dimension of Hn, μ∈ (0,Q) is a real parameter and Qμ=2Q-μQ-2 is the upper critical exponent associated with the Hardy-Littlewood-Sobolev inequality on the Heisenberg group. By introducing the H-reflection, we prove that the solutions of (0.1) are cylindrical, upto Heisenberg translation and suitable scaling of function equation*0.2 u0(ζ)=u0(z,t)=((1+|z|2)2+t2)-Q-24,~~~ζ=(z,t)∈ Hn. equation* Furthermore, we show that these positive solutions are also CR inversion-symmetric with respect to the unit CC sphere. Consequently, we establish the uniqueness of positive solutions to equation (0.1).

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