On the classification of solutions to a class of N-Liouville equations in RN

Abstract

Given N≥ 2 and α>-1, we consider the following weighted Liouville-type equation involving the N-Laplacian: equation* \ aligned -& N u = |x|Nα eu in RN && , \\ & ∫RN |x|Nα eu \, dx < + ∞\,. &&aligned . equation* Solutions have been completely classified when N=2 via complex analysis, and when α=0 using Pohozaev identities and an isoperimetric argument. In this paper, we first devise a P-function approach to the classification result for all α>-1 when N=2. Since it is not based on complex analysis, this alternative and more PDE-oriented approach naturally extends to N≥ 3 by providing the classification for any -1<α≤ 0. In particular, the explicit radial solutions are the unique ones for -1<α≤0 but become degenerate for special values αk>0, a hint that non-radial solutions might arise for α>0 as it happens when N=2.