Inhomogeneous log-Gaussian Cox processes with piecewise constant covariates: a case study in modeling of COVID-19 transmission risk in East Java

IF 3.9 3区 环境科学与生态学 Q1 ENGINEERING, CIVIL
Alwan Fadlurohman, Achmad Choiruddin, Jorge Mateu
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Abstract

The inhomogeneous Log-Gaussian Cox Process (LGCP) defines a flexible point process model for the analysis of spatial point patterns featuring inhomogeneity/spatial trend and aggregation patterns. To fit an LGCP model to spatial point pattern data and study the spatial trend, one could link the intensity function with continuous spatial covariates. Although non-continuous covariates are becoming more common in practice, the existing estimation methods so far only cover covariates in continuous form. As a consequence, to implement such methods, the non-continuous covariates are replaced by the continuous ones by applying some transformation techniques, which are many times problematic. In this paper, we develop a technique for inhomogeneous LGCP involving non-continuous covariates, termed piecewise constant covariates. The method does not require covariates transformation and likelihood approximation, resulting in an estimation technique equivalent to the one for generalized linear models. We apply our method for modeling COVID-19 transmission risk in East Java, Indonesia, which involves five piecewise constant covariates representing population density and sources of crowd. We outline that population density and industry density are significant covariates affecting the COVID-19 transmission risk in East Java.

Abstract Image

具有片断常数协变量的非均质对数-高斯 Cox 过程:东爪哇 COVID-19 传播风险建模案例研究
不均匀对数高斯考克斯过程(LGCP)定义了一个灵活的点过程模型,用于分析具有不均匀性/空间趋势和聚集模式的空间点模式。要将 LGCP 模型拟合到空间点模式数据并研究空间趋势,可以将强度函数与连续空间协变量联系起来。虽然非连续协变量在实践中越来越常见,但现有的估算方法迄今为止只涵盖连续形式的协变量。因此,要实施这些方法,就必须通过应用一些转换技术,将非连续协变量替换为连续协变量,而这在很多时候是有问题的。在本文中,我们开发了一种涉及非连续协变量(称为片断常数协变量)的非均质 LGCP 技术。该方法不需要协变量变换和似然逼近,因此其估计技术等同于广义线性模型的估计技术。我们将这一方法应用于印度尼西亚东爪哇 COVID-19 传播风险的建模,其中涉及代表人口密度和人群来源的五个片断常数协变量。我们概述了人口密度和工业密度是影响东爪哇 COVID-19 传播风险的重要协变量。
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来源期刊
CiteScore
7.10
自引率
9.50%
发文量
189
审稿时长
3.8 months
期刊介绍: Stochastic Environmental Research and Risk Assessment (SERRA) will publish research papers, reviews and technical notes on stochastic and probabilistic approaches to environmental sciences and engineering, including interactions of earth and atmospheric environments with people and ecosystems. The basic idea is to bring together research papers on stochastic modelling in various fields of environmental sciences and to provide an interdisciplinary forum for the exchange of ideas, for communicating on issues that cut across disciplinary barriers, and for the dissemination of stochastic techniques used in different fields to the community of interested researchers. Original contributions will be considered dealing with modelling (theoretical and computational), measurements and instrumentation in one or more of the following topical areas: - Spatiotemporal analysis and mapping of natural processes. - Enviroinformatics. - Environmental risk assessment, reliability analysis and decision making. - Surface and subsurface hydrology and hydraulics. - Multiphase porous media domains and contaminant transport modelling. - Hazardous waste site characterization. - Stochastic turbulence and random hydrodynamic fields. - Chaotic and fractal systems. - Random waves and seafloor morphology. - Stochastic atmospheric and climate processes. - Air pollution and quality assessment research. - Modern geostatistics. - Mechanisms of pollutant formation, emission, exposure and absorption. - Physical, chemical and biological analysis of human exposure from single and multiple media and routes; control and protection. - Bioinformatics. - Probabilistic methods in ecology and population biology. - Epidemiological investigations. - Models using stochastic differential equations stochastic or partial differential equations. - Hazardous waste site characterization.
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