The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras
In the first part of this paper, we show that an AH algebra A=lim→(Ai,ϕi) has the LP property if and only if every element of the centre of Ai belongs to the closure of the linear span of projections in A. As a consequence, a diagonal AH-algebra has the LP property if it has small eigenvalue variati...
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Hindawi Limited
2013-01-01
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| Series: | Abstract and Applied Analysis |
| Online Access: | http://dx.doi.org/10.1155/2013/204319 |
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doaj-eed6a29371c846fe9afdc305580cf1022020-11-24T22:36:21ZengHindawi LimitedAbstract and Applied Analysis1085-33751687-04092013-01-01201310.1155/2013/204319204319The Linear Span of Projections in AH Algebras and for Inclusions of C*-AlgebrasDinh Trung Hoa0Toan Minh Ho1Hiroyuki Osaka2Center of Research and Development, Duy Tan University, K7/25 Quang Trung, Da Nang, VietnamInstitute of Mathematics, VAST, 18 Hoang Quoc Viet, Ha Noi 10307, VietnamDepartment of Mathematical Sciences, Ritsumeikan University, Kusatsu, Shiga 525-8577, JapanIn the first part of this paper, we show that an AH algebra A=lim→(Ai,ϕi) has the LP property if and only if every element of the centre of Ai belongs to the closure of the linear span of projections in A. As a consequence, a diagonal AH-algebra has the LP property if it has small eigenvalue variation in the sense of Bratteli and Elliott. The second contribution of this paper is that for an inclusion of unital C*-algebras P⊂A with a finite Watatani index, if a faithful conditional expectation E:A→P has the Rokhlin property in the sense of Kodaka et al., then P has the LP property under the condition thatA has the LP property. As an application, let A be a simple unital C*-algebra with the LP property, α an action of a finite group G onto Aut(A). If α has the Rokhlin property in the sense of Izumi, then the fixed point algebra AG and the crossed product algebra A ⋊α G have the LP property. We also point out that there is a symmetry on the CAR algebra such that its fixed point algebra does not have the LP property.http://dx.doi.org/10.1155/2013/204319 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Dinh Trung Hoa Toan Minh Ho Hiroyuki Osaka |
| spellingShingle |
Dinh Trung Hoa Toan Minh Ho Hiroyuki Osaka The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras Abstract and Applied Analysis |
| author_facet |
Dinh Trung Hoa Toan Minh Ho Hiroyuki Osaka |
| author_sort |
Dinh Trung Hoa |
| title |
The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras |
| title_short |
The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras |
| title_full |
The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras |
| title_fullStr |
The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras |
| title_full_unstemmed |
The Linear Span of Projections in AH Algebras and for Inclusions of C*-Algebras |
| title_sort |
linear span of projections in ah algebras and for inclusions of c*-algebras |
| publisher |
Hindawi Limited |
| series |
Abstract and Applied Analysis |
| issn |
1085-3375 1687-0409 |
| publishDate |
2013-01-01 |
| description |
In the first part of this paper, we show that an AH algebra A=lim→(Ai,ϕi) has the LP property if and only if every element of the centre of Ai belongs to the closure of the linear span of projections in A. As a consequence, a diagonal AH-algebra has the LP property if it has small eigenvalue variation in the sense of Bratteli and Elliott. The second contribution of this paper is that for an inclusion of unital C*-algebras P⊂A with a finite Watatani index, if a faithful conditional expectation E:A→P has the Rokhlin property in the sense of Kodaka et al., then P has the LP property under the condition thatA has the LP property. As an application, let A be a simple unital C*-algebra with the LP property, α an action of a finite group G onto Aut(A). If α has the Rokhlin property in the sense of Izumi, then the fixed point algebra AG and the crossed product algebra A ⋊α G have the LP property. We also point out that there is a symmetry on the CAR algebra such that its fixed point algebra does not have the LP property. |
| url |
http://dx.doi.org/10.1155/2013/204319 |
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