使用泊松分布和伽马分布量化蒙特卡洛野火模拟中燃烧计数的抽样误差

IF 3.9 3区 环境科学与生态学 Q1 ENGINEERING, CIVIL
Valentin Waeselynck, Gary Johnson, David Schmidt, Max A. Moritz, David Saah
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引用次数: 0

摘要

本文对蒙特卡洛野火模拟中燃烧次数的抽样误差进行了精确的定量描述,即模拟火灾集合是随机和有限的这一事实所带来的预测变异性。我们表明,在典型情况下,边际燃烧计数(非常接近)泊松分布,并通过贝叶斯更新推断出伽马分布是剩余不确定性的合适总结。特别是,燃烧次数的变异系数等于其期望值的倒平方根,而该期望值与模拟火灾次数乘以渐近燃烧概率成正比。根据这些结果,我们得出了选择模拟火灾次数和估计抽样误差的实用指南。值得注意的是,所需的模拟年数是以幂律表示的。这些发现有望使火灾建模人员不再需要耗费大量资源进行迭代实验来确定模拟规模和评估其收敛性:统计理论能更快地提供更好的答案。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Quantifying the sampling error on burn counts in Monte-Carlo wildfire simulations using Poisson and Gamma distributions

Quantifying the sampling error on burn counts in Monte-Carlo wildfire simulations using Poisson and Gamma distributions

This article provides a precise, quantitative description of the sampling error on burn counts in Monte-Carlo wildfire simulations - that is, the prediction variability introduced by the fact that the set of simulated fires is random and finite. We show that the marginal burn counts are (very nearly) Poisson-distributed in typical settings and infer through Bayesian updating that Gamma distributions are suitable summaries of the remaining uncertainty. In particular, the coefficient of variation of the burn count is equal to the inverse square root of its expected value, and this expected value is proportional to the number of simulated fires multiplied by the asymptotic burn probability. From these results, we derive practical guidelines for choosing the number of simulated fires and estimating the sampling error. Notably, the required number of simulated years is expressed as a power law. Such findings promise to relieve fire modelers of resource-consuming iterative experiments for sizing simulations and assessing their convergence: statistical theory provides better answers, faster.

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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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