UNIVERSALITY OF THE TIME CONSTANT FOR 2D CRITICAL FIRST-PASSAGE PERCOLATION
成果类型:
Article
署名作者:
Damron, Michael; Hanson, Jack; Lam, Wai -Kit
署名单位:
University System of Georgia; Georgia Institute of Technology; City University of New York (CUNY) System; City College of New York (CUNY); National Taiwan University
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/22-AAP1808
发表日期:
2023
页码:
1701-1731
关键词:
critical exponents
LIMIT-THEOREMS
摘要:
We consider first-passage percolation (FPP) on the triangular lattice with vertex weights (t(v)) whose common distribution function F satisfies F(0) = 1/2. This is known as the critical case of FPP because large (critical) zeroweight clusters allow travel between distant points in time which is sublinear in the distance. Denoting by T (0, partial derivative B(n)) the first-passage time from 0 to {x : parallel to x parallel to(infinity) = n}, we show existence of a time constant and find its exact value to be lim(n ->infinity) T(0, partial derivative B(n))/log n = 2/2 root 3 pi al almost surely, where I = inf{x > 0 : F(x) > 1/2} and F is any critical distribution for t(v). This result shows that this time constant is universal and depends only on the value of I. Furthermore, we find the exact value of the limiting normalized variance, which is also only a function of I, under the optimal moment condition on F. The proof method also shows an analogous universality on other two-dimensional lattices, assuming the time constant exists.