Sharp existence and classification results for nonlinear elliptic equations in RN\0\ with Hardy potential

Abstract

For N≥ 3, by the seminal paper of Brezis and V\'eron (Arch. Rational Mech. Anal. 75(1):1--6, 1980/81), no positive solutions of - u+uq=0 in RN \0\ exist if q≥ N/(N-2); for 1<q<N/(N-2) the existence and profiles near zero of all positive C1( RN \0\) solutions are given by Friedman and V\'eron (Arch. Rational Mech. Anal. 96(4):359--387, 1986). In this paper, for every q>1 and θ∈ R, we prove that the nonlinear elliptic problem (*) - u-λ \,|x|-2\,u+|x|θuq=0 in RN \0\ with u>0 has a C1( RN \0\) solution if and only if λ>λ*, where λ*=(N-2-) with =(θ+2)/(q-1). We show that (a) if λ>(N-2)2/4, then U0(x)=(λ-λ*)1/(q-1)|x|- is the only solution of (*) and (b) if λ*<λ≤ (N-2)2/4, then all solutions of (*) are radially symmetric and their total set is U0 \Uγ,q,λ:\ γ∈ (0,∞) \. We give the precise behavior of Uγ,q,λ near zero and at infinity, distinguishing between 1<q<qN,θ and q>\qN,θ,1\, where qN,θ=(N+2θ+2)/(N-2). In addition, for θ≤ -2 we settle the structure of the set of all positive solutions of (*) in \0\, subject to u|∂=0, where is a smooth bounded domain containing zero, complementing the works of C\rstea (Mem. Amer. Math. Soc. 227, 2014) and Wei--Du (J. Differential Equations 262(7):3864--3886, 2017).