Quantitative properties of the Hardy-type mean field equation

Abstract

In this paper, we consider the following Hardy-type mean field equation \[ \ array*20c - u-1(1-|x|2)2 u = λ eu, & in \ \ B1,\\ \ \ \ \ u = 0, &\ on\ ∂ B1, array . \] \[\] where λ>0 is small and B1 is the standard unit disc of R2. Applying the moving plane method of hyperbolic space and the accurate expansion of heat kernel on hyperbolic space, we establish the radial symmetry and Brezis-Merle lemma for solutions of Hardy-type mean field equation. Meanwhile, we also derive the quantitative results for solutions of Hardy-type mean field equation, which improves significantly the compactness results for classical mean-field equation obtained by Brezis-Merle and Li-Shafrir. Furthermore, applying the local Pohozaev identity from scaling, blow-up analysis and a contradiction argument, we prove that the solutions are unique when λ is sufficiently close to 0.

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