A Hierarchical Max-Infinitely Divisible Spatial Model for Extreme Precipitation

Bopp, Gregory P.; Shaby, Benjamin A.; Huser, Raphaël

doi:10.1080/01621459.2020.1750414

Cited by 33 publications

(36 citation statements)

References 52 publications

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“…Alternatively, we could assume that the prior for 1/ c (or

β

) is a mixture between a continuous distribution on (0, ∞ ) and a point mass at zero. In the Bayesian context, the recent work of Bopp et al (2020) proposes a hierarchical max‐id model extending the max‐stable Reich and Shaby (2012) model.…”

Section: Discussionmentioning

confidence: 99%

“…Therefore, we always need to choose a finite, and often relatively small, block size, which casts doubts on the validity of the max‐stability assumption in practice. A fast growing body of empirical studies on environmental extremes in the literature has indeed revealed that the max‐stability assumption arising asymptotically is often violated at finite levels (Bopp, Shaby, & Huser, 2020), and that the spatial dependence strength is often weakening as events become more extreme (see, e.g., Bacro, Gaetan, Opitz, & Toulemonde, 2020; Castro‐Camilo & Huser, 2020; Castro‐Camilo, Mhalla, & Opitz, 2020; Davison, Huser, & Thibaud, 2013; Huser, Opitz, & Thibaud, 2017; Huser & Wadsworth, 2020; Tawn, Shooter, Towe, & Lamb, 2018). In particular, under asymptotic independence , maxima become ultimately independent at the highest levels, requiring specialized models capturing the decay rate towards independence.…”

Section: Introductionmentioning

confidence: 99%

“…Padoan (2013) proposed a max‐id model based on Gaussian process ratios, whose dependence strength varies with the intensity of the extreme event. Moreover, a recent implementation of a specific spatial max‐id model using simulation‐based Bayesian inference (Bopp et al, 2020) bears witness of the versatility of such models. Compared to the models proposed by Padoan (2013) and Bopp et al (2020), our proposed max‐id models can control the joint tail decay rate more flexibly, and unlike Padoan (2013), they can be arbitrarily close to popular max‐stable models.…”

Section: Introductionmentioning

confidence: 99%

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Max‐infinitely divisible models and inference for spatial extremes

Huser

Opitz

Thibaud

2020

Scandinavian J Statistics

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For many environmental processes, recent studies have shown that the dependence strength is decreasing when quantile levels increase. This implies that the popular max‐stable models are inadequate to capture the rate of joint tail decay, and to estimate joint extremal probabilities beyond observed levels. We here develop a more flexible modeling framework based on the class of max‐infinitely divisible processes, which extend max‐stable processes while retaining dependence properties that are natural for maxima. We propose two parametric constructions for max‐infinitely divisible models, which relax the max‐stability property but remain close to some popular max‐stable models obtained as special cases. The first model considers maxima over a finite, random number of independent observations, while the second model generalizes the spectral representation of max‐stable processes. Inference is performed using a pairwise likelihood. We illustrate the benefits of our new modeling framework on Dutch wind gust maxima calculated over different time units. Results strongly suggest that our proposed models outperform other natural models, such as the Student‐t copula process and its max‐stable limit, even for large block sizes.

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“…Alternatively, we could assume that the prior for 1/ c (or

β

Section: Discussionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Max‐infinitely divisible models and inference for spatial extremes

Huser

Opitz

Thibaud

2020

Scandinavian J Statistics

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“…First, the χ statistic is a measure of pairwise tail dependence and hence not able to describe the higher-order extremal dependence. Second, χ is an appropriate extremal dependence metric in the case of asymptotic dependence, it is less clear about the usefulness of this measure if the environmental process of interest exhibits weakening spatial dependence as events become more extreme (Huser et al 2017;Wadsworth et al 2017;Huser and Wadsworth 2018;Bopp et al 2018).…”

Section: Discussionmentioning

confidence: 99%

New Exploratory Tools for Extremal Dependence: $$\chi $$ Networks and Annual Extremal Networks

Huang

Cooley

Ebert‐Uphoff

et al. 2019

JABES

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Understanding dependence structure among extreme values plays an important role in risk assessment in environmental studies. In this work, we propose the χ network and the annual extremal network for exploring the extremal dependence structure of environmental processes. A χ network is constructed by connecting pairs whose estimated upper tail dependence coefficient,χ, exceeds a prescribed threshold. We develop an initial χ network estimator, and we use a spatial block bootstrap to assess both the bias and variance of our estimator. We then develop a method to correct the bias of the initial estimator by incorporating the spatial structure in χ. In addition to the χ network, which assesses spatial extremal dependence over an extended period of time, we further introduce an annual extremal network to explore the year-to-year temporal variation of extremal connections. We illustrate the χ and the annual extremal networks by analyzing the hurricane season maximum precipitation at the US Gulf Coast and surrounding area. Analysis suggests there exists long distance extremal dependence for precipitation extremes in the study region and the strength of the extremal dependence may depend on some regional scale meteorological conditions, for example, sea surface temperature.

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“…Max-stable and Pareto processes are asymptotically justified models for spatial extremes, but likelihood computations are usually challenging, even for low or moderate spatial dimensions (see, e.g., Castruccio, Huser and Genton (2016) and ). An exception is the max-stable model of Reich and Shaby (2012) which is computationally tractable for higher spatial dimensions; see also Bopp, Shaby and Huser (2021). However, this max-stable model has been criticized for its lack of flexibility in a variety of applications.…”

mentioning

confidence: 99%

Estimating high-resolution Red Sea surface temperature hotspots, using a low-rank semiparametric spatial model

Hazra

Huser

2021

Ann. Appl. Stat.

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In this work, we estimate extreme sea surface temperature (SST) hotspots, that is, high threshold exceedance regions, for the Red Sea, a vital region of high biodiversity. We analyze high-resolution satellite-derived SST data comprising daily measurements at 16,703 grid cells across the Red Sea over the period 1985-2015. We propose a semiparametric Bayesian spatial mixed-effects linear model with a flexible mean structure to capture spatiallyvarying trend and seasonality, while the residual spatial variability is modeled through a Dirichlet process mixture (DPM) of low-rank spatial Student's t processes (LTPs). By specifying cluster-specific parameters for each LTP mixture component, the bulk of the SST residuals influence tail inference and hotspot estimation only moderately. Our proposed model has a nonstationary mean, covariance, and tail dependence, and posterior inference can be drawn efficiently through Gibbs sampling. In our application, we show that the proposed method outperforms some natural parametric and semiparametric alternatives. Moreover, we show how hotspots can be identified, and we estimate extreme SST hotspots for the whole Red Sea, projected until the year 2100, based on the Representative Concentration Pathways 4.5 and 8.5. The estimated 95% credible region, for joint high threshold exceedances include large areas covering major endangered coral reefs in the southern Red Sea.

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A Hierarchical Max-Infinitely Divisible Spatial Model for Extreme Precipitation

Cited by 33 publications

References 52 publications

Max‐infinitely divisible models and inference for spatial extremes

Max‐infinitely divisible models and inference for spatial extremes

New Exploratory Tools for Extremal Dependence: $$\chi $$ Networks and Annual Extremal Networks

Estimating high-resolution Red Sea surface temperature hotspots, using a low-rank semiparametric spatial model

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