流-网络域空间复杂数据分析的面向对象方法

IF 2.1 2区 数学 Q3 GEOSCIENCES, MULTIDISCIPLINARY Spatial Statistics Pub Date : 2023-11-13 DOI:10.1016/j.spasta.2023.100784
Chiara Barbi, Alessandra Menafoglio, Piercesare Secchi
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引用次数: 0

摘要

我们解决了希尔伯特数据的空间预测问题,当他们的观测空间域是一个河网。该领域的网状性质要求使用基于流距离概念的地质统计学方法,该方法捕获由网络分支引起的河流中点的空间连通性。在面向对象空间统计(O2S2)的框架内,将数据视为适当(功能)嵌入空间的点,我们开发了一类基于流距离的功能移动平均模型。因此,数据的几何形状和空间域的几何形状都被考虑在内。给出了协方差结构的一致定义,并研究了相关估计量。通过对中叉河(美国爱达荷州)夏季水温剖面的分析,我们的方法在协方差结构表征和预测性能方面都证明是有效的。
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An object-oriented approach to the analysis of spatial complex data over stream-network domains

We address the problem of spatial prediction for Hilbert data, when their spatial domain of observation is a river network. The reticular nature of the domain requires to use geostatistical methods based on the concept of Stream Distance, which captures the spatial connectivity of the points in the river induced by the network branching. Within the framework of Object Oriented Spatial Statistics (O2S2), where the data are considered as points of an appropriate (functional) embedding space, we develop a class of functional moving average models based on the Stream Distance. Both the geometry of the data and that of the spatial domain are thus taken into account. A consistent definition of covariance structure is developed, and associated estimators are studied. Through the analysis of the summer water temperature profiles in the Middle Fork River (Idaho, USA), our methodology proved to be effective, both in terms of covariance structure characterization and forecasting performance.

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来源期刊
Spatial Statistics
Spatial Statistics GEOSCIENCES, MULTIDISCIPLINARY-MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
CiteScore
4.00
自引率
21.70%
发文量
89
审稿时长
55 days
期刊介绍: Spatial Statistics publishes articles on the theory and application of spatial and spatio-temporal statistics. It favours manuscripts that present theory generated by new applications, or in which new theory is applied to an important practical case. A purely theoretical study will only rarely be accepted. Pure case studies without methodological development are not acceptable for publication. Spatial statistics concerns the quantitative analysis of spatial and spatio-temporal data, including their statistical dependencies, accuracy and uncertainties. Methodology for spatial statistics is typically found in probability theory, stochastic modelling and mathematical statistics as well as in information science. Spatial statistics is used in mapping, assessing spatial data quality, sampling design optimisation, modelling of dependence structures, and drawing of valid inference from a limited set of spatio-temporal data.
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