SMOLUCHOWSKI PROCESSES AND NONPARAMETRIC ESTIMATION OF FUNCTIONALS OF PARTICLE DISPLACEMENT DISTRIBUTIONS FROM COUNT DATA
成果类型:
Article
署名作者:
Goldenshluger, Alexander; Jacobovic, Royi
署名单位:
University of Haifa
刊物名称:
ANNALS OF APPLIED PROBABILITY
ISSN/ISSBN:
1050-5164
DOI:
10.1214/23-AAP1990
发表日期:
2024
页码:
1224-1270
关键词:
branching-process
diffusion-coefficient
immigration rates
fluctuation
GROWTH
motion
摘要:
Suppose that particles are randomly distributed in R-d, and they are subject to identical stochastic motion independently of each other. The Smoluchowski process describes fluctuations of the number of particles in an observation region over time. This paper studies properties of the Smoluchowski processes and considers related statistical problems. In the first part of the paper we revisit probabilistic properties of the Smoluchowski process in a unified and principled way: explicit formulas for generating functionals and moments are derived, conditions for stationarity and Gaussian approximation are discussed, and relations to other stochastic models are highlighted. The second part deals with statistics of the Smoluchowski processes. We consider two different models of the particle displacement process: the undeviated uniform motion (when a particle moves with random constant velocity along a straight line) and the Brownian motion displacement. In the setting of the undeviated uniform motion we study the problems of estimating the mean speed and the speed distribution, while for the Brownian displacement model the problem of estimating the diffusion coefficient is considered. In all these settings we develop estimators with provable accuracy guarantees.