Continuous spectrum for a class of nonhomogeneous differential operators

Abstract

We study the boundary value problem - div((|∇ u|p1(x)-2+|∇ u|p2(x)-2)∇ u)=λ|u|q(x)-2u in , u=0 on ∂, where is a bounded domain in N with smooth boundary, λ is a positive real number, and the continuous functions p1, p2, and q satisfy 1<p2(x)<q(x)<p1(x)<N and y∈q(y)<N p2(x)N-p2(x) for any x∈. The main result of this paper establishes the existence of two positive constants λ0 and λ1 with λ0≤λ1 such that any λ∈[λ1,∞) is an eigenvalue, while any λ∈(0,λ0) is not an eigenvalue of the above problem.