Non-radial solutions for the critical quasi-linear H\'enon equation involving p-Laplacian in N

Abstract

In this paper, we investigate the following D1,p-critical quasi-linear H\'enon equation involving p-Laplacian equation*00 \ aligned &-p u=|x|αup*-1, & x∈ N, \\ &u>0, & x∈ N, aligned . equation* where N≥2, 1<p<N, p*:=p(N+)N-p and α>0. By carefully studying the linearized problem and applying the approximation method and bifurcation theory, we prove that, when the parameter takes the critical values (k):=p(N+p-2)2+4(k-1)(p-1)(k+N-1)-p(N+p-2)2(p-1) for k≥2, the above quasi-linear H\'enon equation admits non-radial solutions u such that u |x|-N-pp-1 and |∇ u| |x|-N-1p-1 at ∞. One should note that, α(k)=2(k-1) for k≥2 when p=2. Our results successfully extend the classical work of F. Gladiali, M. Grossi, and S. L. N. Neves in GGN concerning the Laplace operator (i.e., the case p=2) to the more general setting of the nonlinear p-Laplace operator (1<p<N). We overcome a series of crucial difficulties, including the nonlinear feature of the p-Laplacian p, the absence of Kelvin type transforms and the lack of the Green integral representation formula.