On a critical Hamiltonian system with Neumann boundary conditions
Abstract
We consider the Hamiltonian system with Neumann boundary conditions: \[ - u + μ u=vq , - v+ μ v=up in , u, v >0 in , ∂ u= ∂ v=0 on ∂ , \] where μ >0 is a parameter and is a smooth bounded domain in RN . When (p, q) approaches from below the critical hyperbola N/(p+1) + N/(q+1)=N-2, we build a solution which blows-up at a boundary point where the mean curvature achieves its minimum and negative value.
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