具有半指数增量的催化分支随机游动

IF 1.4 3区社会学 Q3 DEMOGRAPHY

Mathematical Population Studies Pub Date : 2019-02-03 DOI:10.1080/08898480.2020.1767424

E. Bulinskaya

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引用次数: 8

摘要

摘要在具有任意有限催化剂总数的多维晶格上的催化分支随机游动中，在超临界状态下，当假设随机游动跳跃的矢量坐标彼此独立（或接近独立）并具有半指数分布时，极限定理提供了粒子在人口稠密和空旷区域之间的边界处几乎确定的归一化位置。与具有光分布尾部的随机漫游增量的情况相反，归一化因子随时间的增长速度快于线性增长速度。在半指数尾部的情况下，前部的极限形状不再是凸的，就像在轻尾部的情况一样。

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Catalytic branching random walk with semi-exponential increments

ABSTRACT In a catalytic branching random walk on a multidimensional lattice, with arbitrary finite total number of catalysts, in supercritical regime, when the vector coordinates of the random walk jump are assumed independent (or close to independent) to one another and have semi-exponential distributions, a limit theorem provides the almost sure normalized locations of the particles at the boundary between populated and empty areas. Contrary to the case of random walk increments with light distribution tails, the normalizing factor grows faster than linearly over time. The limit shape of the front in the case of semi-exponential tails is no longer convex, as it is in the case of light tails.

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来源期刊

Mathematical Population Studies 数学-数学跨学科应用

CiteScore

3.20

自引率

11.10%

发文量

审稿时长

>12 weeks

期刊介绍： Mathematical Population Studies publishes carefully selected research papers in the mathematical and statistical study of populations. The journal is strongly interdisciplinary and invites contributions by mathematicians, demographers, (bio)statisticians, sociologists, economists, biologists, epidemiologists, actuaries, geographers, and others who are interested in the mathematical formulation of population-related questions. The scope covers both theoretical and empirical work. Manuscripts should be sent to Manuscript central for review. The editor-in-chief has final say on the suitability for publication.