On generalized eigenvalue problems of fractional (p,q)-Laplace operator with two parameters

Abstract

For s1,s2∈(0,1) and p,q ∈ (1, ∞), we study the following nonlinear Dirichlet eigenvalue problem with parameters α, β ∈ R driven by the sum of two nonlocal operators: equation* (-)s1p u+(-)s2q u=α|u|p-2u+β|u|q-2u\;\;in , u=0\;\;in Rd , \ \ \ (P) equation* where ⊂ Rd is a bounded open set. Depending on the values of α,β, we completely describe the existence and non-existence of positive solutions to (P). We construct a continuous threshold curve in the two-dimensional (α, β)-plane, which separates the regions of the existence and non-existence of positive solutions. In addition, we prove that the first Dirichlet eigenfunctions of the fractional p-Laplace and fractional q-Laplace operators are linearly independent, which plays an essential role in the formation of the curve. Furthermore, we establish that every nonnegative solution of (P) is globally bounded.

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