Let Rn denote n-dimensional Euclidean space, with n > 1. We study the uniqueness of positive solutions u(x), x ∈ Rn, of the semilinear Poisson equation Δu + f(u) = 0 under the assumption that u(x) → 0 as ǀxǀ → ∞. This type of problem arises in phase transition theory, in population genetics, and in the theory of nucleon cores, with various different forms of the driving term f(u). For the important model case f(u) = −u + up, where p is a constant greater than 1, our results show (i) that when the dimension n of the underlying space is 2, there is at most one solution (up to translation) for any given p and (ii) that when the dimension n is 3, there is at most one solution when 1 < p ≤ 3. In both cases, the solution is radially symmetric and monotonically decreasing as one moves outward from the center. For dimensions other than 2 or 3, and indeed for the analogous cases of a real dimensional parameter n > 1, we obtain corresponding results. We note finally, again for the model case, that existence holds for 1 < p < (n + 2)/(n − 2); thus, there remains an interesting difference between the parameter ranges for which existence and uniqueness are established.
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机译:设R n 表示n维欧几里德空间,其中n>1。我们研究半线性Poisson正解u(x),x∈R n 的唯一性假设u(x)→0为ǀxǀ→∞,则等式Δu+ f(u)= 0。这种类型的问题出现在相变理论,种群遗传学和核子核心理论中,具有各种不同形式的驱动项f(u)。对于重要的模型情况f(u)= − u + u p ,其中 p < / em>是大于1的常数,我们的结果表明( i )当基础空间的尺寸 n 为2时,最多有一个解(向上对于任何给定的 p 和( ii ),当维度 n 为3时,当1 em> p ≤3。在两种情况下,解决方案都是径向对称的,并且随着一个从中心向外移动而单调递减。对于2或3以外的尺寸,以及对于实际尺寸参数 n p <( n + 2)/( n − 2) ;因此,在建立存在性和唯一性的参数范围之间仍然存在有趣的差异。
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