Quasi-invariance of completely random measures

Ibraheem, Habeebat O.; Lytvynov, Eugene

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Quasi-invariance of completely random measures

Habeebat O. Ibraheem, Eugene Lytvynov

Methods of Functional Analysis and Topology, Volume: 24, Issue: 3, Pages: 207 - 239

Swansea University Author: Eugene Lytvynov

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Abstract

Let $X$ be a locally compact Polish space. Let $\mathbb K(X)$ denote the space of discrete Radon measures on $X$. Let $\mu$ be a completely random discrete measure on $X$, i.e., $\mu$ is (the distribution of) a completely random measure on $X$ that is concentrated on $\mathbb K(X)$. We consider the...

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Published in:	Methods of Functional Analysis and Topology
ISSN:	1029-3531
Published:	2018
Online Access:	Check full text
URI:	https://cronfa.swan.ac.uk/Record/cronfa38956

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spelling	2018-10-19T11:44:45.0282633 v2 38956 2018-03-06 Quasi-invariance of completely random measures e5b4fef159d90a480b1961cef89a17b7 0000-0001-9685-7727 Eugene Lytvynov Eugene Lytvynov true false 2018-03-06 MACS Let $X$ be a locally compact Polish space. Let $\mathbb K(X)$ denote the space of discrete Radon measures on $X$. Let $\mu$ be a completely random discrete measure on $X$, i.e., $\mu$ is (the distribution of) a completely random measure on $X$ that is concentrated on $\mathbb K(X)$. We consider the multiplicative (current) group $C_0(X\to\mathbb R_+)$ consisting of functions on $X$ that take values in $\mathbb R_+=(0,\infty)$ and are equal to 1 outside a compact set. Each element $\theta\in C_0(X\to\mathbb R_+)$ maps $\mathbb K(X)$ onto itself; more precisely, $\theta$ sends a discrete Radon measure $\sum_i s_i\delta_{x_i}$ to $\sum_i \theta(s_i)s_i\delta_{x_i}$. Thus, elements of $C_0(X\to\mathbb R_+)$ transform the weights of discrete Radon measures. We study conditions under which the measure $\mu$ is quasi-invariant under the action of the current group $C_0(X\to\mathbb R_+)$ and consider several classes of examples. We further assume that $X=\mathbb R^d$ and consider the group of local diffeomorphisms $\operatorname{Diff}_0(X)$. Elements of this group also map $\mathbb K(X)$ onto itself. More precisely, a diffeomorphism $\varphi\in \operatorname{Diff}_0(X)$ sends a discrete Radon measure $\sum_i s_i\delta_{x_i}$ to $\sum_i s_i\delta_{\varphi(x_i)}$. Thus, diffeomorphisms from $\operatorname{Diff}_0(X)$ transform the atoms of discrete Radon measures. We study quasi-invariance of $\mu$ under the action of $\operatorname{Diff}_0(X)$. We finally consider the semidirect product $\mathfrak G:=\operatorname{Diff}_0(X)\times C_0(X\to \mathbb R_+)$ and study conditions of quasi-invariance and partial quasi-invariance of $\mu$ under the action of $\mathfrak G$. Journal Article Methods of Functional Analysis and Topology 24 3 207 239 1029-3531 31 10 2018 2018-10-31 http://mfat.imath.kiev.ua/article/?id=1083 COLLEGE NANME Mathematics and Computer Science School COLLEGE CODE MACS Swansea University 2018-10-19T11:44:45.0282633 2018-03-06T11:25:36.3513215 Faculty of Science and Engineering School of Mathematics and Computer Science - Mathematics Habeebat O. Ibraheem 1 Eugene Lytvynov 0000-0001-9685-7727 2 0038956-19102018114258.pdf 38956v2.pdf 2018-10-19T11:42:58.5930000 Output 349651 application/pdf Version of Record true 2018-10-18T00:00:00.0000000 Released under the terms of a Creative Commons Attribution-ShareAlike 4.0 International License (CC BY-SA). true eng
title	Quasi-invariance of completely random measures
spellingShingle	Quasi-invariance of completely random measures Eugene Lytvynov
title_short	Quasi-invariance of completely random measures
title_full	Quasi-invariance of completely random measures
title_fullStr	Quasi-invariance of completely random measures
title_full_unstemmed	Quasi-invariance of completely random measures
title_sort	Quasi-invariance of completely random measures
author_id_str_mv	e5b4fef159d90a480b1961cef89a17b7
author_id_fullname_str_mv	e5b4fef159d90a480b1961cef89a17b7_***_Eugene Lytvynov
author	Eugene Lytvynov
author2	Habeebat O. Ibraheem Eugene Lytvynov
format	Journal article
container_title	Methods of Functional Analysis and Topology
container_volume	24
container_issue	3
container_start_page	207
publishDate	2018
institution	Swansea University
issn	1029-3531
college_str	Faculty of Science and Engineering
hierarchytype
hierarchy_top_id	facultyofscienceandengineering
hierarchy_top_title	Faculty of Science and Engineering
hierarchy_parent_id	facultyofscienceandengineering
hierarchy_parent_title	Faculty of Science and Engineering
department_str	School of Mathematics and Computer Science - Mathematics{{{_:::_}}}Faculty of Science and Engineering{{{_:::_}}}School of Mathematics and Computer Science - Mathematics
url	http://mfat.imath.kiev.ua/article/?id=1083
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description	Let $X$ be a locally compact Polish space. Let $\mathbb K(X)$ denote the space of discrete Radon measures on $X$. Let $\mu$ be a completely random discrete measure on $X$, i.e., $\mu$ is (the distribution of) a completely random measure on $X$ that is concentrated on $\mathbb K(X)$. We consider the multiplicative (current) group $C_0(X\to\mathbb R_+)$ consisting of functions on $X$ that take values in $\mathbb R_+=(0,\infty)$ and are equal to 1 outside a compact set. Each element $\theta\in C_0(X\to\mathbb R_+)$ maps $\mathbb K(X)$ onto itself; more precisely, $\theta$ sends a discrete Radon measure $\sum_i s_i\delta_{x_i}$ to $\sum_i \theta(s_i)s_i\delta_{x_i}$. Thus, elements of $C_0(X\to\mathbb R_+)$ transform the weights of discrete Radon measures. We study conditions under which the measure $\mu$ is quasi-invariant under the action of the current group $C_0(X\to\mathbb R_+)$ and consider several classes of examples. We further assume that $X=\mathbb R^d$ and consider the group of local diffeomorphisms $\operatorname{Diff}_0(X)$. Elements of this group also map $\mathbb K(X)$ onto itself. More precisely, a diffeomorphism $\varphi\in \operatorname{Diff}_0(X)$ sends a discrete Radon measure $\sum_i s_i\delta_{x_i}$ to $\sum_i s_i\delta_{\varphi(x_i)}$. Thus, diffeomorphisms from $\operatorname{Diff}_0(X)$ transform the atoms of discrete Radon measures. We study quasi-invariance of $\mu$ under the action of $\operatorname{Diff}_0(X)$. We finally consider the semidirect product $\mathfrak G:=\operatorname{Diff}_0(X)\times C_0(X\to \mathbb R_+)$ and study conditions of quasi-invariance and partial quasi-invariance of $\mu$ under the action of $\mathfrak G$.
published_date	2018-10-31T04:18:04Z
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score	11.089572

Quasi-invariance of completely random measures

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