Existence and asymptotic behavior of least energy sign-changing solutions for Schrodinger-Poisson systems with doubly critical exponents

Abstract

In this paper, we are concerned with the following Schr\"odinger-Poisson system with critical nonlinearity and critical nonlocal term due to the Hardy-Littlewood-Sobolev inequality equationcases - u+u+λφ |u|3u =|u|4u+ |u|q-2u,\ \ &\ x ∈ R3,\\[2mm] - φ=|u|5, \ \ &\ x ∈ R3, cases equation where λ∈ R is a parameter and q∈(2,6). If λ (q+28)2 and q∈(2,6), the above system has no nontrivial solution. If λ∈ (λ*,0) for some λ*<0, we obtain a least energy radial sign-changing solution uλ to the above system. Furthermore, we consider λ as a parameter and analyze the asymptotic behavior of uλ as λ 0-.

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