Multivariate Gaussian processes: definitions, examples and applications

Zexun Chen; Jun Fan; Kuo Wang

doi:10.1007/s40300-023-00238-3

Multivariate Gaussian processes: definitions, examples and applications

Zexun Chen, Jun Fan, Kuo Wang

School of Mathematical Sciences

Research output: Journal Publication › Article › peer-review

9 Citations (Scopus)

Abstract

Gaussian processes occupy one of the leading places in modern statistics and probability theory due to their importance and a wealth of strong results. The common use of Gaussian processes is in connection with problems related to estimation, detection, and many statistical or machine learning models. In this paper, we propose a precise definition of multivariate Gaussian processes based on Gaussian measures on vector-valued function spaces, and provide an existence proof. In addition, several fundamental properties of multivariate Gaussian processes, such as stationarity and independence, are introduced. We further derive two special cases of multivariate Gaussian processes, including multivariate Gaussian white noise and multivariate Brownian motion, and present a brief introduction to multivariate Gaussian process regression as a useful statistical learning method for multi-output prediction problems.

Original language	English
Pages (from-to)	181-191
Number of pages	11
Journal	Metron
Volume	81
Issue number	2
DOIs	https://doi.org/10.1007/s40300-023-00238-3 https://doi.org/10.1007/s40300-023-00238-3
Publication status	Published - Aug 2023

Keywords

Brownian motion
Gaussian measure
Gaussian process
Matrix-variate Gaussian distribution
Multivariate Gaussian distribution
Multivariate Gaussian process

ASJC Scopus subject areas

Statistics and Probability

Access to Document

Cite this

@article{63fa527f1277468789f2e223044e739e,

title = "Multivariate Gaussian processes: definitions, examples and applications",

abstract = "Gaussian processes occupy one of the leading places in modern statistics and probability theory due to their importance and a wealth of strong results. The common use of Gaussian processes is in connection with problems related to estimation, detection, and many statistical or machine learning models. In this paper, we propose a precise definition of multivariate Gaussian processes based on Gaussian measures on vector-valued function spaces, and provide an existence proof. In addition, several fundamental properties of multivariate Gaussian processes, such as stationarity and independence, are introduced. We further derive two special cases of multivariate Gaussian processes, including multivariate Gaussian white noise and multivariate Brownian motion, and present a brief introduction to multivariate Gaussian process regression as a useful statistical learning method for multi-output prediction problems.",

keywords = "Brownian motion, Gaussian measure, Gaussian process, Matrix-variate Gaussian distribution, Multivariate Gaussian distribution, Multivariate Gaussian process",

author = "Zexun Chen and Jun Fan and Kuo Wang",

note = "Publisher Copyright: {\textcopyright} 2023, The Author(s).",

year = "2023",

month = aug,

doi = "10.1007/s40300-023-00238-3",

language = "English",

volume = "81",

pages = "181--191",

journal = "Metron",

issn = "0026-1424",

publisher = "Springer-Verlag Italia s.r.l.",

number = "2",

}

TY - JOUR

T1 - Multivariate Gaussian processes

T2 - definitions, examples and applications

AU - Chen, Zexun

AU - Fan, Jun

AU - Wang, Kuo

PY - 2023/8

Y1 - 2023/8

N2 - Gaussian processes occupy one of the leading places in modern statistics and probability theory due to their importance and a wealth of strong results. The common use of Gaussian processes is in connection with problems related to estimation, detection, and many statistical or machine learning models. In this paper, we propose a precise definition of multivariate Gaussian processes based on Gaussian measures on vector-valued function spaces, and provide an existence proof. In addition, several fundamental properties of multivariate Gaussian processes, such as stationarity and independence, are introduced. We further derive two special cases of multivariate Gaussian processes, including multivariate Gaussian white noise and multivariate Brownian motion, and present a brief introduction to multivariate Gaussian process regression as a useful statistical learning method for multi-output prediction problems.

AB - Gaussian processes occupy one of the leading places in modern statistics and probability theory due to their importance and a wealth of strong results. The common use of Gaussian processes is in connection with problems related to estimation, detection, and many statistical or machine learning models. In this paper, we propose a precise definition of multivariate Gaussian processes based on Gaussian measures on vector-valued function spaces, and provide an existence proof. In addition, several fundamental properties of multivariate Gaussian processes, such as stationarity and independence, are introduced. We further derive two special cases of multivariate Gaussian processes, including multivariate Gaussian white noise and multivariate Brownian motion, and present a brief introduction to multivariate Gaussian process regression as a useful statistical learning method for multi-output prediction problems.

KW - Brownian motion

KW - Gaussian measure

KW - Gaussian process

KW - Matrix-variate Gaussian distribution

KW - Multivariate Gaussian distribution

KW - Multivariate Gaussian process

UR - http://www.scopus.com/inward/record.url?scp=85146954220&partnerID=8YFLogxK

U2 - 10.1007/s40300-023-00238-3

DO - 10.1007/s40300-023-00238-3

M3 - Article

SN - 0026-1424

VL - 81

SP - 181

EP - 191

JO - Metron

JF - Metron

IS - 2

ER -

Multivariate Gaussian processes: definitions, examples and applications

Abstract

Keywords

ASJC Scopus subject areas

Access to Document

Other files and links

Fingerprint

Cite this