Asymptotic behavior for the Brezis-Nirenberg problem. The subcritical perturbation case

Abstract

In this paper, we are concerned with the well-known Brezis-Nirenberg problem equation* cases - u= u2*-1+ uq-1, u>0, &in~,\\ \ \ u=0, &on~∂ , cases equation* where ⊂ RN with N 3 is a bounded domain, q∈(2,2*) and 2*=2NN-2 denotes the critical Sobolev exponent. It is well-known (H. Br\'ezis and L. Nirenberg, Comm. Pure Appl. Math., 36(4):437--477, 1983) that the above problem admits a positive least energy solution for all >0 and q>\2,4N-2\. In the present paper, we first analyze the asymptotic behavior of the positive least energy solution as 0 and establish a sharp asymptotic characterisation of the profile and blow-up rate of the least energy solution. Then, we prove the uniqueness and nondegeneracy of the least energy solution under some mild assumptions on domain . The main results in this paper can be viewed as a generalization of the results for q=2 previously established in the literature. But the situation is quite different from the case q=2, and the blow-up rate not only heavily depends on the space dimension N and the geometry of the domain , but also depends on the exponent q∈(\2,4N-2\, 2*) in a non-trivial way.

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