2015
DOI: 10.1214/14-sts487
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Cross-Covariance Functions for Multivariate Geostatistics

Abstract: Continuously indexed datasets with multiple variables have become ubiquitous in the geophysical, ecological, environmental and climate sciences, and pose substantial analysis challenges to scientists and statisticians. For many years, scientists developed models that aimed at capturing the spatial behavior for an individual process; only within the last few decades has it become commonplace to model multiple processes jointly. The key difficulty is in specifying the cross-covariance function, that is, the func… Show more

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Cited by 259 publications
(218 citation statements)
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References 121 publications
(130 reference statements)
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“…On this basis, other applications of non-separable spatiotemporal covariance models (Gneiting et al, 2007;Genton and Kleiber, 2015), have great potential for further research in the alpine cryosphere. …”
mentioning
confidence: 99%
“…On this basis, other applications of non-separable spatiotemporal covariance models (Gneiting et al, 2007;Genton and Kleiber, 2015), have great potential for further research in the alpine cryosphere. …”
mentioning
confidence: 99%
“…The paper by [11] reviews the main approaches to building multivariate correlation and covariance structures, including the multivariate MatĂ©rn models.…”
Section: Definition 3 ([17]) a Homogeneous And Isotropic Random Fieldmentioning
confidence: 99%
“…, N . Here, B is the beta function (Porcu et al, 2013;Genton and Kleiber, 2015). To illustrate the differences between the shape of the Gaspari-Cohn and the Askey functions, we show the Gaspari-Cohn function for c = 25 and the univariate Askey function for c = 50 and Îœ = 1, .…”
Section: Multivariate Localizationmentioning
confidence: 99%
“…Kleiber and Porcu (2015) constructed nonstationary correlation functions with compact support for multivariate random fields. Genton and Kleiber (2015) reviewed approaches to building models for covariances between two different variables such as compactly supported correlation functions for multivariate Gaussian random fields.…”
Section: Introductionmentioning
confidence: 99%