Sequence of Cubes of Finite Vertices Fuzzy Topographic Topological Mapping and k-Fibonacci Sequence
Azrul Azim Mohd Yunus1, Tahir Ahmad2

1Azrul Azim Mohd Yunus, Department of Financial Mathematics, Faculty of Science and Technology, University Sains Islam Malaysia.

2Tahir Ahmad, Centre  Sustainable Nano Materials, Ibnu Sina Institute Scientific and Industrial Research, University Technology, Malaysia.

Manuscript received on 05 June 2019 | Revised Manuscript received on 12 June 2019 | Manuscript Published on 19 June 2019 | PP: 123-125 | Volume-8 Issue-8S June 2019 | Retrieval Number: H10230688S19/19©BEIESP

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Abstract: Fuzzy Topographic Topological Mapping  is a model for solving neuromagnetic inverse problem.  consists of four components and connected by three algorithms. version 1 and  version 2 were designed to present 3D view of an unbounded single current and bounded multicurrent sources, respectively. In 2008, Jamaian introduced some definitions on sequence of One of the features produced from the sequences of  is Cube of . A cube of  is a combination of two or more  in  In this paper, cube of finite vertices of  namely  are discussed. Consequently, some theorems are proven in order to describe patterns for sequence of cubes for  based on the k-Fibonacci sequence. Interestingly, the cube of  appears to be an example of generalized Fibonacci sequence, namely the k-Fibonacci sequence.

Keywords: Fuzzy Topographic Topological Mapping, Sequence, k-Fibonacci Sequences.
Scope of the Article: Fuzzy Logics