Abstract

In this paper we study the existence and multiplicity solutions of nonlinear elliptic problem of the form

Here Ω is a smooth and bounded domain in R^N , N ≥ 2, λ ∈ R and f : R → R is a continuous, even function satisfying the following condition

for some c ₁, c ₂, c ₃, p, α ∈ R, c ₁, c ₂, c ₃, α > 0 and p > 1+ α.  We shall show that, for λ ∈ R, g ∈ L_r (Ω) if N = 2, r > 1, p > 1 + α or  the above problem has solutions. Assuming additionally that, λ ≤ λ₁ and f is decreasing for t ≤ 0, we shall show that, this problem have exctly one solution. We take advantage of the fact, that a continuous, proper and odd (injective) map of the form I + C (where C is compact) is suriective (a homeomorphism).

First Published Online: 14 Oct 2010