On the Fucik spectrum of the wave operator and an asymptotically linear problem

Abstract

We study generalized solutions of the nonlinear wave equation utt-uss=au+-bu-+p(s,t,u), with periodic conditions in t and homogeneous Dirichlet conditions in s, under the assumption that the ratio of the period to the length of the interval is two. When p 0 and λ is a nonzero eigenvalue of the wave operator, we give a proof of the existence of two families of curves (which may coincide) in the Fucik spectrum intersecting at (λ,λ). This result is known for some classes of self-adjoint operators (which does not cover the situation we consider here), but in a smaller region than ours. Our approach is based on a dual variational formulation and is also applicable to other operators, such as the Laplacian. In addition, we prove an existence result for the nonhomogeneous situation, when the pair (a,b) is not `between' the Fucik curves passing through (λ,λ)≠(0,0) and p is a continuous function, sublinear at infinity.