Please use this identifier to cite or link to this item: http://hdl.handle.net/1822/5752

 Title: Semigroups of injective linear transformations with infinite defect Author(s): Gonçalves, Suzana Mendes Keywords: Bi-idealsQuasi-idealsSemigroups of linear transformations Issue date: Jan-2006 Publisher: Taylor & Francis Journal: Communications in Algebra Citation: "Communications in Algebra". ISSN 0092-7872. 34:1 (2006) 289-302. Abstract(s): Given an infinite-dimensional vector space $V$, we consider the semigroup $KN(p,q)$ consisting of all injective linear transformations $\alpha:V\to V$ for which the codimension of the range of $\alpha$ is at least $q$, where $\dim V=p\geq q\geq\aleph_0$. In 2001, Kemprasit and Namnak considered the semigroup $KN(p,\aleph_0)$ while deciding when certain subsemigroups of $T(V)$, the semigroup under composition of all linear transformations from $V$ to $V$, belong to ${\bf BQ}$, the class of all semigroups whose sets of bi-ideals and quasi-ideals coincide. In this paper, we determine when $KN(p,q)$ belongs to ${\bf BQ}$ in terms of the dimension of $V$. Next we characterise Green's relations on $KN(p,q)$ and determine its one and two sided ideals; and we use this information to show that $KN(p,q)$ is a model for certain types of algebraic semigroups. Then we describe all quasi-ideals and bi-ideals of $KN(p,q)$. We also determine its maximal right simple subsemigroups. Type: Article URI: http://hdl.handle.net/1822/5752 DOI: 10.1080/00927870500346271 ISSN: 0092-78721532-4125 Publisher version: The original publication is available at taylorandfrancis.metapress.com Peer-Reviewed: yes Access: Open access Appears in Collections: CMAT - Artigos em revistas com arbitragem / Papers in peer review journals

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