Abstract
In this note, we consider the directed first passage percolation introduced in [F. Comets, R. Fukushima, S. Nakajima and N. Yoshida: Journal of Statistical Physics, 161-(3), 577–597 (2015)]. It is proved that the shortest path from the origin to the $n$-th hyperplane makes a jump larger than a positive power of $\log n$. Some numerical results are also provided, which indicates that the maximal jump size is much larger in a certain parameter region.
Information
Published: 1 January 2021
First available in Project Euclid: 20 January 2022
Digital Object Identifier: 10.2969/aspm/08710213
Subjects:
Primary:
60K37
Secondary:
60K35
,
82A51
,
82D30
Keywords:
Directed polymer
,
first passage percolation
,
Ground states
,
random environment
,
zero temperature
Rights: Copyright © 2021 Mathematical Society of Japan