STABILITY OF THE WULFF MINIMUM AND FLUCTUATIONS IN SHAPE FOR LARGE FINITE CLUSTERS IN 2-DIMENSIONAL PERCOLATION

被引:13
|
作者
ALEXANDER, KS
机构
[1] Department of Mathematics DRB 155, University of Southern California, Los Angeles, 90089-1113, CA
来源
PROBABILITY THEORY AND RELATED FIELDS | 1992年 / 91卷 / 3-4期
关键词
D O I
10.1007/BF01192068
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
For two-dimensional Bernoulli percolation at density p above the critical point, there exists a natural norm g determined by the rate of decay of the connectivity function in every direction. If W is the region of unit area with boundary of minimum possible g-length, then it is known [4] that as N --> infinity, with probability approaching 1, conditionally on N less-than-or-equal-to \C(0)\ < infinity, the cluster C(0) of the origin approximates W in shape to within a factor of 1 +/- eta(N) for some eta(N) --> 0. Here a bound is established for the size eta(N) of the fluctuations. Other types of conditioning which result in the formation of a shape approximating W are also considered. This is related to the quadratic stability of the variational minimum achieved by the Wulff curve partial-derivative W: for some k > 0, if gamma is a curve enclosing a region of unit area such that the Hausdorff distance d(H)(gamma + upsilon, dW) greater-than-or-equal-to delta for every translate gamma + upsilon, then the g-length g(gamma) greater-than-or-equal-to g (partial-derivative W) + k-delta(2), at least for delta-small.
引用
收藏
页码:507 / 532
页数:26
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