Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders

Let V be any vector space and I(V) the set of all partial injective linear transformations defined on V, that is, all injective linear transformations α: A → B where A, B are subspaces of V. Then I(V) is a semigroup under composition. Let W be a subspace of V. Define I(V, W)={α∈ I(V): V α ⊆ W}. So I...

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Main Authors: Sangkhanan K., Sanwong J.
Format: Article
Language:English
Published: 2014
Online Access:http://www.scopus.com/inward/record.url?eid=2-s2.0-84869017393&partnerID=40&md5=db97695e77cb9ad240ff61529d683f09
http://cmuir.cmu.ac.th/handle/6653943832/6941
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spelling th-cmuir.6653943832-69412014-08-30T03:51:24Z Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders Sangkhanan K. Sanwong J. Let V be any vector space and I(V) the set of all partial injective linear transformations defined on V, that is, all injective linear transformations α: A → B where A, B are subspaces of V. Then I(V) is a semigroup under composition. Let W be a subspace of V. Define I(V, W)={α∈ I(V): V α ⊆ W}. So I(V,W) is a subsemigroup of I(V). In this paper, we present the largest regular subsemigroup of I(V, W) and determine its Green's relations. Furthermore, we study the natural partial order ≤ on I(V, W) in terms of domains and images, compare ≤ with the subset order and find elements of I(V, W) which are compatible. © 2012 Academic Publications, Ltd. 2014-08-30T03:51:24Z 2014-08-30T03:51:24Z 2012 Article 13118080 http://www.scopus.com/inward/record.url?eid=2-s2.0-84869017393&partnerID=40&md5=db97695e77cb9ad240ff61529d683f09 http://cmuir.cmu.ac.th/handle/6653943832/6941 English
institution Chiang Mai University
building Chiang Mai University Library
country Thailand
collection CMU Intellectual Repository
language English
description Let V be any vector space and I(V) the set of all partial injective linear transformations defined on V, that is, all injective linear transformations α: A → B where A, B are subspaces of V. Then I(V) is a semigroup under composition. Let W be a subspace of V. Define I(V, W)={α∈ I(V): V α ⊆ W}. So I(V,W) is a subsemigroup of I(V). In this paper, we present the largest regular subsemigroup of I(V, W) and determine its Green's relations. Furthermore, we study the natural partial order ≤ on I(V, W) in terms of domains and images, compare ≤ with the subset order and find elements of I(V, W) which are compatible. © 2012 Academic Publications, Ltd.
format Article
author Sangkhanan K.
Sanwong J.
spellingShingle Sangkhanan K.
Sanwong J.
Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
author_facet Sangkhanan K.
Sanwong J.
author_sort Sangkhanan K.
title Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
title_short Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
title_full Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
title_fullStr Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
title_full_unstemmed Semigroups of injective partial linear transformations with restricted range: Green's relations and partial orders
title_sort semigroups of injective partial linear transformations with restricted range: green's relations and partial orders
publishDate 2014
url http://www.scopus.com/inward/record.url?eid=2-s2.0-84869017393&partnerID=40&md5=db97695e77cb9ad240ff61529d683f09
http://cmuir.cmu.ac.th/handle/6653943832/6941
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