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引用次数: 0
摘要
高斯随机场完全由其均值和协方差函数表征。双曲空间上的随机场仅在有限的范围内被研究过,即不随时间演变的标量值场的情况。本文挑战的是在双曲空间上随时间演化的多变量(矢量值)随机场的二阶特征问题。具体来说,我们描述了在空间(双曲空间)上各向同性(径向对称)、在时间(实线)上静止的连续时空协方差函数的特征。我们的发现与最近的发现类似,这些发现是针对空间为 n 维球面或更一般的两点均质空间的情况提出的。我们的主要结果可以理解为一个谱表示定理,我们还详细说明了协方差函数的子情形的主要结果,该协方差函数的谱相对于勒贝格度量是绝对连续的(技术细节报告如下)。
Multivariate Random Fields Evolving Temporally Over Hyperbolic Spaces
Gaussian random fields are completely characterised by their mean value and covariance function. Random fields on hyperbolic spaces have been studied to a limited extent only, namely for the case of scalar-valued fields that are not evolving over time. This paper challenges the problem of the second-order characteristics of multivariate (vector-valued) random fields that evolve temporally over hyperbolic spaces. Specifically, we characterise the continuous space–time covariance functions that are isotropic (radially symmetric) over space (the hyperbolic space) and stationary over time (the real line). Our finding is the analogue of recent findings that have been shown for the case where the space is either the n-dimensional sphere or more generally a two-point homogeneous space. Our main result can be read as a spectral representation theorem, and we also detail the main result for the subcase of covariance functions having a spectrum that is absolutely continuous with respect to the Lebesgue measure (technical details are reported below).