Nehari Manifold for fractional Kirchhoff system with critical nonlinearity

Abstract

In this paper, we show the existence and multiplicity of positive solutions of the following fractional Kirchhoff system\\ equation \ arrayrllll LM(u)&=λ f(x)|u|q-2u+ 2αα+β|u|α-2u|v|β & in ,\\ LM(v)&=μ g(x)|v|q-2v+ 2βα+β|u|α|v|β-2v & in ,\\ u&=v=0 &in RN , array . equation where LM(u)=M( ∫|(-)s2u|2dx)(-)s u is a double non-local operator due to Kirchhoff term M(t)=a+b t with a, b>0 and fractional Laplacian (-)s, s∈(0, 1). We consider that is a bounded domain in RN, 2s<N≤ 4s with smooth boundary, f, g are sign changing continuous functions, λ, μ>0 are real parameters, 1<q<2, α, β 2 and α+β=2s*=2N/(N-2s) is a fractional critical exponent. Using the idea of Nehari manifold technique and a compactness result based on classical idea of Brezis-Lieb Lemma, we prove the existence of at least two positive solutions for (λ, μ) lying in a suitable subset of R2+.