Cylindrically Symmetric Ground State Solutions for Curl-Curl Equations with Critical Exponent
Abstract
We study the following nonlinear critical curl-curl equation equationeq0.1∇× ∇× U +V(x)U=|U|p-2U+ |U|4U, x∈ R3,equation where V(x)=V(r, x3) with r=x12+x22 is 1-periodic in x3 direction and belongs to L∞(3). When 0∈ σ(-+1r2+V) and p∈(4,6), we prove the existence of nontrivial solution for (eq0.1), which is indeed a ground state solution in a suitable cylindrically symmetric space. Especially, if σ(-+1r2+V)>0, a ground state solution is obtained for any p∈(2,6).
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