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Augmented Gaussian random field: Theory and computation

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<p style='text-indent:20px;'>We propose the novel augmented Gaussian random field (AGRF), which is a universal framework incorporating the data of observable and derivatives of any order. Rigorous theory is established. We prove that under certain conditions, the observable and its derivatives of any order are governed by a single Gaussian random field, which is the aforementioned AGRF. As a corollary, the statement "the derivative of a Gaussian process remains a Gaussian process" is validated, since the derivative is represented by a part of the AGRF. Moreover, a computational method corresponding to the universal AGRF framework is constructed. Both noiseless and noisy scenarios are considered. Formulas of the posterior distributions are deduced in a nice closed form. A significant advantage of our computational method is that the universal AGRF framework provides a natural way to incorporate arbitrary order derivatives and deal with missing data. We use four numerical examples to demonstrate the effectiveness of the computational method. The numerical examples are composite function, damped harmonic oscillator, Korteweg-De Vries equation, and Burgers' equation.

Contributor(s)
Author: Zhang, Sheng
Author: Yang, Xiu
Author: Tindel, Samy
Author: Lin, Guang
Publisher
American Institute of Mathematical Sciences (AIMS)
Date Issued
1905-07-14
Language
English
Type
Genre
Form
electronic document
Media type
Creator role
Faculty
Identifier
1937-1632
1937-1179
Has this item been published elsewhere?
Volume
15
Volume
4
Zhang, . S., Yang, . X., Tindel, . S., & Lin, . G. (1905). (Vols. 4). https://doi.org/10.3934/dcdss.2021098
Zhang, Sheng, Xiu Yang, Samy Tindel, and Guang Lin. 1905. https://doi.org/10.3934/dcdss.2021098.
Zhang, Sheng, et al. 14 July 1905, https://doi.org/10.3934/dcdss.2021098.