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Article type: Research Article
Authors: Kanaksabee, Pillay | Dookhitram, Kumar | Bhuruth, Muddun
Affiliations: Department of Business Information and Software Engineering, School of Innovative Technologies and Engineering, University of Technology, Mauritius, La Tour-Koenig Pointe-aux-Sables, Republic of Mauritius | Department of Applied Mathematical Sciences, School of Innovative Technologies and Engineering, University of Technology, Mauritius, La Tour-Koenig Pointe-aux-Sables, Republic of Mauritius | Department of Mathematics, Faculty of Science, University of Mauritius, Réduit, Republic of Mauritius
Note: [] Corresponding author. Kumar Dookhitram, Department of Applied Mathematical Sciences, School of Innovative Technologies and Engineering, University of Technology, Mauritius, La Tour-Koenig Pointe-aux-Sables, Republic of Mauritius. E-mail: kdookhitram@umail.utm.ac.mu
Abstract: The eigenvalue problem arises in many application areas and in the fuzzy setting, focus has always been geared towards the finding of solution for the whole set of eigenvalues and corresponding eigenvectors. This paper introduces the computation of a few eigenpairs of a matrix with triangular fuzzy numbers as elements, where the modal matrix is assumed to be sparse and real symmetric. A two-step procedure is developed for the solution of this type of fuzzy eigenvalue problem. The first step solves the 1-cut of the problem, where the well-known Krylov subspace method, implicitly restarted Lanczos algorithm, is employed to approximate part of the spectrum with respect to either smallest or largest eigenvalues. The second step assigns unknown symmetric linear spreads to the approximate eigenpairs. Numerical experiments are provided to illustrate the efficiency of the proposed scheme for determining fuzzy symmetric eigenpairs of a fuzzy matrix.
Keywords: Fuzzy matrix, Eigenvalue, Krylov subspace, Implicitly restarted Lanczos method, Symmetric spread solutions
DOI: 10.3233/IFS-131030
Journal: Journal of Intelligent & Fuzzy Systems, vol. 27, no. 2, pp. 717-727, 2014
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