Green's relations and partial orders on semigroups of partial linear transformations with restricted range

Let V be any vector space and P(V) the set of all partial linear transformations defined on V, that is, all linear transformations α: S → T where S; T are subspaces of V. Then P(V) is a semigroup under composition. Let W be a subspace of V. We define PT(V;W) = {α ∈ P(V): Vα ⊆ W}. So PT(V,W) is a sub...

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Main Authors:	Kritsada Sangkhanan, Jintana Sanwong
格式:	雜誌
出版:	2018
在線閱讀:	https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84896301309&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/45351
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機構:	Chiang Mai University

id	th-cmuir.6653943832-45351
record_format	dspace
spelling	th-cmuir.6653943832-453512018-01-24T06:09:00Z Green's relations and partial orders on semigroups of partial linear transformations with restricted range Kritsada Sangkhanan Jintana Sanwong Let V be any vector space and P(V) the set of all partial linear transformations defined on V, that is, all linear transformations α: S → T where S; T are subspaces of V. Then P(V) is a semigroup under composition. Let W be a subspace of V. We define PT(V;W) = {α ∈ P(V): Vα ⊆ W}. So PT(V,W) is a subsemigroup of P(V). In this paper, we present the largest regular subsemigroup and determine Green's relations on PT(V;W). Furthermore, we study the natural partial order ≤ on PT(V;W) in terms of domains and images and find elements of PT(V,W) which are compatible. © 2014 by the Mathematical Association of Thailand. All rights reserved. 2018-01-24T06:09:00Z 2018-01-24T06:09:00Z 2014-01-01 Journal 16860209 2-s2.0-84896301309 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84896301309&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/45351
institution	Chiang Mai University
building	Chiang Mai University Library
country	Thailand
collection	CMU Intellectual Repository
description	Let V be any vector space and P(V) the set of all partial linear transformations defined on V, that is, all linear transformations α: S → T where S; T are subspaces of V. Then P(V) is a semigroup under composition. Let W be a subspace of V. We define PT(V;W) = {α ∈ P(V): Vα ⊆ W}. So PT(V,W) is a subsemigroup of P(V). In this paper, we present the largest regular subsemigroup and determine Green's relations on PT(V;W). Furthermore, we study the natural partial order ≤ on PT(V;W) in terms of domains and images and find elements of PT(V,W) which are compatible. © 2014 by the Mathematical Association of Thailand. All rights reserved.
format	Journal
author	Kritsada Sangkhanan Jintana Sanwong
spellingShingle	Kritsada Sangkhanan Jintana Sanwong Green's relations and partial orders on semigroups of partial linear transformations with restricted range
author_facet	Kritsada Sangkhanan Jintana Sanwong
author_sort	Kritsada Sangkhanan
title	Green's relations and partial orders on semigroups of partial linear transformations with restricted range
title_short	Green's relations and partial orders on semigroups of partial linear transformations with restricted range
title_full	Green's relations and partial orders on semigroups of partial linear transformations with restricted range
title_fullStr	Green's relations and partial orders on semigroups of partial linear transformations with restricted range
title_full_unstemmed	Green's relations and partial orders on semigroups of partial linear transformations with restricted range
title_sort	green's relations and partial orders on semigroups of partial linear transformations with restricted range
publishDate	2018
url	https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84896301309&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/45351
_version_	1681422729088073728

Green's relations and partial orders on semigroups of partial linear transformations with restricted range

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