We consider stable solutions of a semilinear elliptic equation with homogeneous Neumann boundary conditions. A classical result of Casten, Holland and Matano states that all stable solutions are constant in convex bounded domains. In this paper, we examine whether this result extends to unbounded convex domains. We give a positive answer for stable non-degenerate solutions, and for stable solutions if the domain Omega further satisfies Omega boolean AND{vertical bar x vertical bar <= R} = O(R-2), when R -> +infinity. If the domain is a straight cylinder, an additional natural assumption is needed. These results can be seen as an extension to more general domains of some results on De Giorgi's conjecture. As an application, we establish asymptotic symmetries for stable solutions when the domain satisfies a geometric property asymptotically.
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机译:我们考虑具有齐次诺伊曼边界条件的半线性椭圆型方程的稳定解。Casten、Holland和Matano的一个经典结果表明,在凸有界区域中,所有稳定解都是常数。在本文中,我们检验了这个结果是否扩展到无界凸域。对于稳定的非退化解,我们给出了一个肯定的答案,对于稳定解,当R->+无穷大时,如果域ω进一步满足ω布尔和{vertical bar x vertical bar<=R}=O(R-2)。如果域是直圆柱,则需要一个额外的自然假设。这些结果可以看作是对De Giorgi猜想中一些结果的更一般领域的扩展。作为一个应用,当域渐近满足几何性质时,我们建立了稳定解的渐近对称性。
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