Multiple solutions for a Neumann system involving subquadratic nonlinearities

Abstract

In this paper we consider the model semilinear Neumann system \ arraylll - u+a(x)u=λ c(x) Fu(u,v)& in & ,\\ - v+b(x)v=λ c(x) Fv(u,v)& in & ,\\ ∂ u∂ =∂ v∂ =0 & on & ∂, array. where ⊂ RN is a smooth open bounded domain, denotes the outward unit normal to ∂ , λ≥ 0 is a parameter, a,b,c∈ L+∞()\0\, and F∈ C1(R2,R)\0\ is a nonnegative function which is subquadratic at infinity. Two nearby numbers are determined in explicit forms, λ and λ with 0<λ≤ λ, such that for every 0≤ λ< λ, system (Nλ) has only the trivial pair of solution, while for every λ> λ, system (Nλ) has at least two distinct nonzero pairs of solutions.