Non-degeneracy and uniqueness of ground states to nonlinear elliptic equations with mixed local and nonlocal operators

Abstract

This paper concerns the non-degeneracy and uniqueness of ground states to the following nonlinear elliptic equation with mixed local and nonlocal operators, - u +(-)s u + λ u=|u|p-2u in \,\,\, B, u=0 in \,\,\, N B, where N ≥ 2, 0<s<1, 2<p<2*:=2N(N-2)+, λ > -λ1, (-)s denotes the fractional Laplacian, λ1>0 denotes the first Dirichlet eigenvalue of the operator - +(-)s in B and B denotes the unit ball in N. We prove that the second eigenvalue to the linearized operator - +(-)s -(p-1)up-2 in the space of radially symmetric functions is simple, the corresponding eigenfunction changes sign precisely once in the radial direction, where u is a ground state. By deriving a new Hopf type lemma, we then get that -λ cannot be an eigenvalue of the linearized operator, which in turns leads to the non-degeneracy of ground states. Moreover, by establishing a Picone type identity with respect to antisymmetric functions, we then derive the non-degeneracy of ground states in the space of non-radially symmetric functions. Relying on the non-degeneracy of ground states and adapting a blow-up argument together with a continuation argument, we then obtain the uniqueness of ground states.