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DOI | 10.1007/s00477-017-1417-9 |
Alternating Gaussian process modulated renewal processes for modeling threshold exceedances and durations | |
Schliep, Erin M.1; Gelfand, Alan E.2; Holland, David M.3 | |
发表日期 | 2018-02-01 |
ISSN | 1436-3240 |
卷号 | 32期号:2页码:401-417 |
英文摘要 | It is often of interest to model the incidence and duration of threshold exceedance events for an environmental variable over a set of monitoring locations. Such data arrive over continuous time and can be considered as observations of a two-state process yielding, sequentially, a length of time in the below threshold state followed by a length of time in the above threshold state, then returning to the below threshold state, etc. We have a two-state continuous time Markov process, often referred to as an alternating renewal process. The process is observed over a truncated time window and, within this window, duration in each state is modeled using a distinct cumulative intensity specification. Initially, we model each intensity over the window using a parametric regression specification. We extend the regression specification adding temporal random effects to enrich the model using a realization of a log Gaussian process over time. With only one type of renewal, this specification is referred to as a Gaussian process modulated renewal process. Here, we introduce Gaussian process modulation to the intensity for each state. Model fitting is done within a Bayesian framework. We clarify that fitting with a customary log Gaussian process specification over a lengthy time window is computationally infeasible. The nearest neighbor Gaussian process, which supplies sparse covariance structure, is adopted to enable tractable computation. We propose methods for both generating data under our models and for conducting model comparison. The model is applied to hourly ozone data for four monitoring sites at different locations across the United States for the ozone season of 2014. For each site, we obtain estimated profiles of up-crossing and down-crossing intensity functions through time. In addition, we obtain inference regarding the number of exceedances, the distribution of the duration of exceedance events, and the proportion of time in the above and below threshold state for any time interval. |
英文关键词 | Cumulative risk;Hazard;Log Gaussian process;Markov chain Monte Carlo;Nearest neighbor Gaussian process;Representative points;Stochastic integration |
语种 | 英语 |
WOS记录号 | WOS:000425109900007 |
来源期刊 | STOCHASTIC ENVIRONMENTAL RESEARCH AND RISK ASSESSMENT |
来源机构 | 美国环保署 |
文献类型 | 期刊论文 |
条目标识符 | http://gcip.llas.ac.cn/handle/2XKMVOVA/59435 |
作者单位 | 1.Univ Missouri, 146 Middlebush Hall, Columbia, MO 65211 USA; 2.Duke Univ, Durham, NC 27708 USA; 3.US EPA, Natl Exposure Res Lab, Res Triangle Pk, NC 27711 USA |
推荐引用方式 GB/T 7714 | Schliep, Erin M.,Gelfand, Alan E.,Holland, David M.. Alternating Gaussian process modulated renewal processes for modeling threshold exceedances and durations[J]. 美国环保署,2018,32(2):401-417. |
APA | Schliep, Erin M.,Gelfand, Alan E.,&Holland, David M..(2018).Alternating Gaussian process modulated renewal processes for modeling threshold exceedances and durations.STOCHASTIC ENVIRONMENTAL RESEARCH AND RISK ASSESSMENT,32(2),401-417. |
MLA | Schliep, Erin M.,et al."Alternating Gaussian process modulated renewal processes for modeling threshold exceedances and durations".STOCHASTIC ENVIRONMENTAL RESEARCH AND RISK ASSESSMENT 32.2(2018):401-417. |
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