On the Eigenvalues of the p\&q- Fractional Laplacian

Abstract

We consider the eigenvalue problem for the fractional p \& q-Laplacian equation \aligned (- )ps\, u + μ(- )qs\, u+ |u|p-2u+μ|u|q-2u=λ\ V(x)|u|p-2u & in \\ u=0& inN, aligned. equation where is an open bounded, and possibly disconnected domain, λ∈, 1<q<p<Ns, μ>0 with a weight function in L∞() that is allowed no change sign. We show that the problem has a continuous spectrum. Moreover, our result reveals a discontinuity property for the spectrum as the parameter μ 0+. In addition, a stability property of eigenvalues as s 1- is established.