MODULUS OF CONTINUITY OF POLYMER WEIGHT PROFILES IN BROWNIAN LAST PASSAGE PERCOLATION
成果类型:
Article
署名作者:
Hammond, Alan
署名单位:
University of California System; University of California Berkeley
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/19-AOP1350
发表日期:
2019
页码:
3911-3962
关键词:
fluctuations
airy
摘要:
In last passage percolation models lying in the KPZ universality class, the energy of long energy-maximizing paths may be studied as a function of the paths' pair of endpoint locations. Scaled coordinates may be introduced, so that these maximizing paths, or polymers, now cross unit distances with unit-order fluctuations, and have scaled energy, or weight, of unit order. In this article, we consider Brownian last passage percolation in these scaled coordinates. In the narrow wedge case, one endpoint of such polymers is fixed, say at (0, 0) is an element of R-2, and the other is varied horizontally, over (z, 1), z is an element of R, so that the polymer weight profile is a function of z is an element of R. This profile is known to manifest a one-half power law, having 1/2-Holder continuity. The polymer weight profile may be defined beginning from a much more general initial condition. In this article, we present a more general assertion of this one-half power law, as well as a bound on the polylogarithmic correction. The polymer weight profile admits a modulus of continuity of order x(1/2) (log x(-1))(2/3), with a high degree of uniformity in the scaling parameter and over a very broad class of initial data.