QUENCHED INVARIANCE PRINCIPLES FOR THE MAXIMAL PARTICLE IN BRANCHING RANDOM WALK IN RANDOM ENVIRONMENT AND THE PARABOLIC ANDERSON MODEL
成果类型:
Article
署名作者:
Cerny, Jiri; Drewitz, Alexander
署名单位:
University of Basel; University of Cologne
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/19-AOP1347
发表日期:
2020
页码:
94-146
关键词:
CENTRAL-LIMIT-THEOREM
brownian-motion
traveling-waves
minimal position
CONVERGENCE
height
intermittency
equation
fronts
delay
摘要:
We consider branching random walk in spatial random branching environment (BRWRE) in dimension one, as well as related differential equations: the Fisher-KPP equation with random branching and its linearized version, the parabolic Anderson model (PAM). When the random environment is bounded, we show that after recentering and scaling, the position of the maximal particle of the BRWRE, the front of the solution of the PAM, as well as the front of the solution of the randomized Fisher-KPP equation fulfill quenched invariance principles. In addition, we prove that at time t the distance between the median of the maximal particle of the BRWRE and the front of the solution of the PAM is in 0(1110. This partially transfers classical results of Bramson (Comm. Pure Appl. Math. 31 (1978) 531-581) to the setting of BRWRE.
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