Non-existence of solutions for a mean field equation on flat tori at critical parameter 16π
Abstract
It is known from LW that the solvability of the mean field equation u+eu=8nπ δ0 with n∈N≥ 1 on a flat torus Eτ essentially depends on the geometry of Eτ. A conjecture is the non-existence of solutions for this equation if Eτ is a rectangular torus, which was proved for n=1 in LW. For any n∈ N≥2, this conjecture seems challenging from the viewpoint of PDE theory. In this paper, we prove this conjecture for n=2 (i.e. at critical parameter 16π).
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