Fucik spectrum for the operator with rapidly increasing weight and applications

Abstract

In this paper, we study the Fucik spectrum for the operator with rapidly increasing weight, which is defined as a set comprising those (α, β) ∈ R2 such that equation* \arrayl L u:=- u-12(x · ∇ u)=α u+-β u-, in\ RN,\\ u∈ X, array. equation* has a non-trivial solution u, where, N≥1, u = ( u, 0), u=u+-u-. The existence of a first nontrivial curve C of this spectrum, along with some of its properties (e.g., Lipschitz continuity, strict decrease and asymptotic behavior) is investigated in this paper. Our difficulty is that the problem is defined on the whole space RN, and therefore certain estimates do not carry over from the Fucik problem on bounded domains. As an application, we establish the multiplicity of solutions to the following problem equation* \arrayl - u-12(x · ∇ u)=f(x,u), in\ RN,\\ u∈ X, array. equation* where, N≥1 and the nonlinearity f is asymptotically linear at zero and at infinity.