Eigenvalues of nonlinear (p,q)-fractional Laplace operators under nonlocal Neumann conditions

Abstract

In this paper, we investigate on a bounded open set of RN with smooth boundary, an eigenvalue problem involving the sum of nonlocal operators (-)ps1+ (-)qs2 with s1,s2∈ (0,1), p,q∈ (1,∞) and subject to the corresponding homogeneous nonlocal (p,q)-Neumann boundary condition. A careful analysis of the considered problem leads us to a complete description of the set of eigenvalues as being the precise interval \0\(λ1(s2,q),∞), where λ1(s2,q) is the first nonzero eigenvalue of the homogeneous fractional q-Laplacian under nonlocal q-Neumann boundary condition. Furthermore, we establish that every eigenfunctions is globally bounded.