The Li-Lin's open problem on RN

Abstract

In 2012, Y.Y. Li and C.-S. Lin (Arch. Ration. Mech. Anal., 203(3): 943-968) posed an open problem concerning the existence of positive solutions to the elliptic equation cases - u = -λ |x|-s1|u|p-2u + |x|-s2|u|q-2u & in , u = 0 & on ∂ , cases for λ > 0, p > q = 2*(s2), 0 ≤ s1 < s2 < 2, and 2*(s) = 2(N-s)N-2 denotes the Hardy-Sobolev critical exponent, initially studied in bounded domains ⊂ RN, N ≥ 3. Currently, research on this open problem remains limited, and a complete resolution is still far from being achieved. Motivated by the need to address this open problem in more general settings, we extend our investigation to the entire space RN, focusing on the equation - u + u = -λ |x|-s1|u|p-2u + |x|-s2|u|q-2u in RN. Our analysis reveals stark contrasts between bounded and unbounded domains: in RN, the equation admits no solution when q = 2*(s2) for any λ > 0, whereas a positive solution exists when q < 2*(s2). To establish these results, we employ the Nehari manifold method; however, the functional's unboundedness from below on the manifold causes standard global minimization techniques to be inapplicable. Instead, we characterize a local minimizer of the energy functional on the Nehari manifold, overcoming the challenge posed by the lack of a global minimizer.