KEUNIKAN GAUGE-INVARIANT PADA ALJABAR GRAF
Diberikan graf berarah berhingga baris E serta aljabar-C^* A dan B. Misalkan {s,p} merupakan keluarga Cuntz-Krieger-E di aljabar-C^* A dan {T,Q} merupakan keluarga Cuntz-Krieger-E di aljabar-C^* B. Selanjutnya aljabar-C^* yang dibangun oleh {s,p} dinotasikan dengan C^* (E), dan aljabar-C^* yang diba...
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2016-04-26.
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| 001 | repoupi_27034 | ||
| 042 | |a dc | ||
| 100 | 1 | 0 | |a Handayani, Rosalina |e author |
| 245 | 0 | 0 | |a KEUNIKAN GAUGE-INVARIANT PADA ALJABAR GRAF |
| 260 | |c 2016-04-26. | ||
| 500 | |a http://repository.upi.edu/27034/1/S_MAT_1203127_Title.pdf | ||
| 500 | |a http://repository.upi.edu/27034/2/S_MAT_1203127_Abstract.pdf | ||
| 500 | |a http://repository.upi.edu/27034/3/S_MAT_1203127_Table_of_content.pdf | ||
| 500 | |a http://repository.upi.edu/27034/4/S_MAT_1203127_Chapter1.pdf | ||
| 500 | |a http://repository.upi.edu/27034/5/S_MAT_1203127_Chapter2.pdf | ||
| 500 | |a http://repository.upi.edu/27034/6/S_MAT_1203127_Chapter3.pdf | ||
| 500 | |a http://repository.upi.edu/27034/7/S_MAT_1203127_Chapter4.pdf | ||
| 500 | |a http://repository.upi.edu/27034/8/S_MAT_1203127_Chapter5.pdf | ||
| 500 | |a http://repository.upi.edu/27034/9/S_MAT_1203127_Bibliography.pdf | ||
| 500 | |a http://repository.upi.edu/27034/10/S_MAT_1203127_Appendix.pdf | ||
| 520 | |a Diberikan graf berarah berhingga baris E serta aljabar-C^* A dan B. Misalkan {s,p} merupakan keluarga Cuntz-Krieger-E di aljabar-C^* A dan {T,Q} merupakan keluarga Cuntz-Krieger-E di aljabar-C^* B. Selanjutnya aljabar-C^* yang dibangun oleh {s,p} dinotasikan dengan C^* (E), dan aljabar-C^* yang dibangun oleh {T,Q} dinotasikan dengan C^* (T,Q). Pada skripsi ini dibahas bahwa jika terdapat aksi kontinu β∶ T⟶Aut B sedemikian sehingga β_z (T_e )=zT_e dan β_z (Q_v )=Q_v di keluarga Cuntz-Krieger-E {T,Q} dengan Q_v≠0, maka π_(T,Q) adalah isomorfisma dari C^* (E) ke C^* (T,Q). Kata Kunci: graf, keluarga Cuntz-Krieger, aksi kontinu, isomorfisma. Let E be a row finite directed graph and C^*-algebra A and B. Suppose that {s,p} is a Cuntz-Krieger E-family in C^*-algebra A and {T,Q} is a Cuntz-Krieger E-family in C^*-algebra B. We denote the C^*-algebra generated by the family {s,p} as C^* (E), and the C^*-algebra generated by the family {T,Q} as C^* (T,Q). In this bachelor thesis it is discussed when there is a continuous action β∶ T⟶Aut B such that β_z (T_e )=zT_e and β_z (Q_v )=Q_v in Cuntz-Krieger E-family {T,Q} with each Q_v≠0, then π_(T,Q) is an isomorphism of C^* (E) onto C^* (T,Q). Key Word: graph, Cuntz-Krieger families, continuous action, isomorphism | ||
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| 546 | |a en | ||
| 546 | |a en | ||
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| 546 | |a en | ||
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| 546 | |a en | ||
| 546 | |a en | ||
| 546 | |a en | ||
| 546 | |a en | ||
| 690 | |a QA Mathematics | ||
| 655 | 7 | |a Thesis |2 local | |
| 655 | 7 | |a NonPeerReviewed |2 local | |
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| 787 | 0 | |n http://repository.upi.edu | |
| 856 | |u https://repository.upi.edu/27034 |z Link Metadata | ||