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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| Main Authors: | , |
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| Format: | Article |
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Zhengzhou University
2014
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| Online Access: | http://eprints.utm.my/id/eprint/62413/ http://www.lifesciencesite.com/lsj/life1110/045_24958life111014_316_319.pdf |
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| Summary: | 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. |
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