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arxiv: dg-ga/9710023 · v3 · submitted 1997-10-22 · dg-ga · math.DG

Existence results for mean field equations

W. Ding , J. Jost , J. Li , G. Wang This is my paper
classification dg-ga math.DG
keywords betafieldmeanomegaadmitsannulusboundarycase
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Let $\Omega$ be an annulus. We prove that the mean field equation $-\Delta\psi=\frac{e\sp{-\beta\psi}}{\int\sb{\Omega}e\sp{-\beta\psi}} $ admits a solution with zero boundary for $\beta\in (-16\pi,-8\pi)$. This is a supercritical case for the Moser-Trudinger inequality.

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