Standing waves for two-component elliptic system with critical growth in R4: the attractive case

Abstract

In this paper, we consider the following two-component elliptic system with critical growth equation* cases - u+(V1(x)+λ)u=μ1u3+β uv2, \ \ x∈ R4, - v+(V2(x)+λ)v=μ2v3+β vu2, \ \ x∈ R4 , % u≥ 0, \ \ v≥ 0 \ in \ 4. cases equation* where Vj(x) ∈ L2(R4) are nonnegative potentials and the nonlinear coefficients β ,μj, j=1,2, are positive. Here we also assume λ>0. By variational methods combined with degree theory, we prove some results about the existence and multiplicity of positive solutions under the hypothesis β>\μ1,μ2\. These results generalize the results for semilinear Schr\"odinger equation on half space by Cerami and Passaseo (SIAM J. Math. Anal., 28, 867-885, (1997)) to the above elliptic system, while extending the existence result from Liu and Liu (Calc. Var. Partial Differential Equations, 59:145, (2020)).

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