Qualitative properties of positive solutions to mixed local and nonlocal critical problems in Rn

Abstract

We consider the following mixed local and non-local critical elliptic equation: equation*0.1 \ arraylll - u+(-)su=λ h up+u2*-1, &in\,\, Rn, u>0, & in \,\, Rn, |x|∞ u(x) = 0, array . equation* where n≥slant4, \,\, p∈ (0,2*-1),\,\, 2*:=2nn-2 and h is a positive function. We first show the existence and regularity results of viscosity solutions to the above critical elliptic equation. More precisely, from Su-Xu weak solutions are obtained and we prove they are indeed viscosity solutions and their regularity is: \( u ∈ Cα(Rn) \) for p∈(0,1); \( u ∈ C2,β(Rn) \) for p∈ [1, 2*-1). Moreover, for p∈ [1, 2*-1), these viscosity solutions are indeed classical ones and we then prove the existence of positive solutions with the qualitative properties such as the decay estimates and the radial symmetry.

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