Abstract :
In this paper, we study the multiplicity of positive solutions for the following concave–convex elliptic
equation:
⎧⎨⎩
− u +u = fλ(x)uq−1 +gμ(x)up−1 in RN,
u 0 in RN,
u ∈ H1 RN ,
where 1 < q <2 < p <2∗ (2∗ = 2N
N−2 if N 3, 2∗ =∞ if N = 1, 2) and the parameters λ,μ 0. We
assume that fλ(x) = λf+(x)+f−(x) is sign-changing and gμ(x) = a(x)+μb(x), where the functions f±,
a and b satisfy suitable conditions.
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