Asymptotic behavior of least energy solutions to the nonlinear Hartree equation near critical exponent
Abstract
In this paper, we study that the nearly critical nonlocal problem equation* aligned &- u=(|x|-(n-2) up-ε)up-1-ε in , &u>0 in1mm , &u=0 on2.5mm∂, aligned . equation* where is a smooth bounded domain in Rn for n=3,4,5, denotes the standard convolution, ε>0 is a small parameter and p=n+2n-2 is energy-critical exponent. We study the asymptotic behavior of least energy solutions as ε→0. These solutions are shown to blow-up at exactly one point x0 and location of this point is characterized. In addition, the shape and exact rates for blowing-up are studied. Finally, in order to further locate the blowing-up point x0, we prove that x0 is a global maximum point of the Robin's function of .
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