2020_Book_AnInvitationToStatisticsInWass.pdf

This open access book presents the key aspects of statistics in Wasserstein spaces, i.e. statistics in the space of probability measures when endowed with the geometry of optimal transportation. Further to reviewing state-of-the-art aspects, it also provides an accessible introduction to the fundame...

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Γλώσσα:	English
Έκδοση:	Springer Nature 2020
Διαθέσιμο Online:	https://www.springer.com/9783030384388

id	oapen-20.500.12657-37704
record_format	dspace
spelling	oapen-20.500.12657-377042020-05-14T00:44:10Z An Invitation to Statistics in Wasserstein Space Panaretos, Victor M. Zemel, Yoav Probability Theory and Stochastic Processes Optimal Transportation Monge-Kantorovich Problem Barycenter Multimarginal Transport Functional Data Analysis Point Processes Random Measures Manifold Statistics Open Access Geometrical statistics Wasserstein metric Fréchet mean Procrustes analysis Phase variation Gradient descent Probability & statistics Stochastics bic Book Industry Communication::P Mathematics & science::PB Mathematics::PBT Probability & statistics This open access book presents the key aspects of statistics in Wasserstein spaces, i.e. statistics in the space of probability measures when endowed with the geometry of optimal transportation. Further to reviewing state-of-the-art aspects, it also provides an accessible introduction to the fundamentals of this current topic, as well as an overview that will serve as an invitation and catalyst for further research. Statistics in Wasserstein spaces represents an emerging topic in mathematical statistics, situated at the interface between functional data analysis (where the data are functions, thus lying in infinite dimensional Hilbert space) and non-Euclidean statistics (where the data satisfy nonlinear constraints, thus lying on non-Euclidean manifolds). The Wasserstein space provides the natural mathematical formalism to describe data collections that are best modeled as random measures on Euclidean space (e.g. images and point processes). Such random measures carry the infinite dimensional traits of functional data, but are intrinsically nonlinear due to positivity and integrability restrictions. Indeed, their dominating statistical variation arises through random deformations of an underlying template, a theme that is pursued in depth in this monograph. ; Gives a succinct introduction to necessary mathematical background, focusing on the results useful for statistics from an otherwise vast mathematical literature. Presents an up to date overview of the state of the art, including some original results, and discusses open problems. Suitable for self-study or to be used as a graduate level course text. Open access. 2020-05-13T14:21:04Z 2020-05-13T14:21:04Z 2020 book ONIX_20200513_9783030384388_4 http://library.oapen.org/handle/20.500.12657/37704 eng SpringerBriefs in Probability and Mathematical Statistics application/pdf n/a 2020_Book_AnInvitationToStatisticsInWass.pdf https://www.springer.com/9783030384388 Springer Nature Springer 10.1007/978-3-030-38438-8 10.1007/978-3-030-38438-8 6c6992af-b843-4f46-859c-f6e9998e40d5 Springer 147 Cham open access
institution	OAPEN
collection	DSpace
language	English
description	This open access book presents the key aspects of statistics in Wasserstein spaces, i.e. statistics in the space of probability measures when endowed with the geometry of optimal transportation. Further to reviewing state-of-the-art aspects, it also provides an accessible introduction to the fundamentals of this current topic, as well as an overview that will serve as an invitation and catalyst for further research. Statistics in Wasserstein spaces represents an emerging topic in mathematical statistics, situated at the interface between functional data analysis (where the data are functions, thus lying in infinite dimensional Hilbert space) and non-Euclidean statistics (where the data satisfy nonlinear constraints, thus lying on non-Euclidean manifolds). The Wasserstein space provides the natural mathematical formalism to describe data collections that are best modeled as random measures on Euclidean space (e.g. images and point processes). Such random measures carry the infinite dimensional traits of functional data, but are intrinsically nonlinear due to positivity and integrability restrictions. Indeed, their dominating statistical variation arises through random deformations of an underlying template, a theme that is pursued in depth in this monograph. ; Gives a succinct introduction to necessary mathematical background, focusing on the results useful for statistics from an otherwise vast mathematical literature. Presents an up to date overview of the state of the art, including some original results, and discusses open problems. Suitable for self-study or to be used as a graduate level course text. Open access.
title	2020_Book_AnInvitationToStatisticsInWass.pdf
spellingShingle	2020_Book_AnInvitationToStatisticsInWass.pdf
title_short	2020_Book_AnInvitationToStatisticsInWass.pdf
title_full	2020_Book_AnInvitationToStatisticsInWass.pdf
title_fullStr	2020_Book_AnInvitationToStatisticsInWass.pdf
title_full_unstemmed	2020_Book_AnInvitationToStatisticsInWass.pdf
title_sort	2020_book_aninvitationtostatisticsinwass.pdf
publisher	Springer Nature
publishDate	2020
url	https://www.springer.com/9783030384388
_version_	1771297589025570816

2020_Book_AnInvitationToStatisticsInWass.pdf

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