Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping
Fuzzy Topographic topological Mapping (FTTM) is a mathematical model for solving neuromagnetic inverse problem. FTTM consists of four topological spaces which are connected by three different algorithms. In 2006, Yun showed that FTTM version 1 and FTTM version 2 are homeomorphic, and this homeomorph...
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Zhengzhou University
2014
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my.utm.624132017-06-14T01:21:36Z http://eprints.utm.my/id/eprint/62413/ Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping Ahmad, Tahir Abd. Elrahman Elsafi, Mohamed Sayed Q Science Fuzzy Topographic topological Mapping (FTTM) is a mathematical model for solving neuromagnetic inverse problem. FTTM consists of four topological spaces which are connected by three different algorithms. In 2006, Yun showed that FTTM version 1 and FTTM version 2 are homeomorphic, and this homeomorphism generated 14 new elements of FTTM. This paper presents a recurrence formula to determine the number of the new elements from a combination of k versions of FTTM with respect to n components. Zhengzhou University 2014 Article PeerReviewed Ahmad, Tahir and Abd. Elrahman Elsafi, Mohamed Sayed (2014) Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping. Life Science Journal, 11 (10). pp. 316-319. ISSN 1097-8135 http://www.lifesciencesite.com/lsj/life1110/045_24958life111014_316_319.pdf |
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Q Science Ahmad, Tahir Abd. Elrahman Elsafi, Mohamed Sayed Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
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Fuzzy Topographic topological Mapping (FTTM) is a mathematical model for solving neuromagnetic inverse problem. FTTM consists of four topological spaces which are connected by three different algorithms. In 2006, Yun showed that FTTM version 1 and FTTM version 2 are homeomorphic, and this homeomorphism generated 14 new elements of FTTM. This paper presents a recurrence formula to determine the number of the new elements from a combination of k versions of FTTM with respect to n components. |
| format |
Article |
| author |
Ahmad, Tahir Abd. Elrahman Elsafi, Mohamed Sayed |
| author_facet |
Ahmad, Tahir Abd. Elrahman Elsafi, Mohamed Sayed |
| author_sort |
Ahmad, Tahir |
| title |
Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| title_short |
Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| title_full |
Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| title_fullStr |
Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| title_full_unstemmed |
Recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| title_sort |
recurrence formula to determine the number of new elements for fuzzy topographic topological mapping |
| publisher |
Zhengzhou University |
| publishDate |
2014 |
| url |
http://eprints.utm.my/id/eprint/62413/ http://www.lifesciencesite.com/lsj/life1110/045_24958life111014_316_319.pdf |
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13.18916 |