Nondegeneracy of positive solutions for critical Hartree equation on Heisenberg group and it's applications

Abstract

We study the uniqueness and nondegeneracy of positive bubble solutions for the generalized energy-critical Hartree equation on the Heisenberg group Hn, equation0.1 -Hu=(∫Hn|u(η)|Qμ|η-1|μdη)|u|Qμ-2u,~~~,η∈Hn, equation where H represents the Kohn Laplacian, u(η) is a real-valued function, Q=2n+2 is the homogeneous dimension of Hn, μ∈ (0,Q) is a real parameter and Qμ is the upper critical exponent following the Hardy-Littlewood-Sobolev inequality on the Heisenberg group. By applying the Cayley transform, the spherical harmonic decomposition and the Funk-Hecke formula of the spherical harmonic function, we prove the nondegeneracy of positive bubble solutions for (0.1). As an applications, we investigate the asymptotic behavior of the solutions for the Brezis-Nirenberg type problem as → 0 equation0.2 \ aligned &-Hu= u+(∫|u(η)|Qμ|η-1|μdη )|u|Qμ-2u,~~&&in~⊂ Hn, &u=0,~~&&on~∂. aligned . equation