Title of article
Eigenspace structure of a max-drast fuzzy matrix
Author/Authors
Martin Gavalec، نويسنده , , Martin and Rashid، نويسنده , , Imran and Cimler، نويسنده , , Richard، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2014
Pages
14
From page
100
To page
113
Abstract
The structure of the eigenspace of a given fuzzy matrix is considered in a specific max-t-norm algebra, called max-drast algebra, where the least t-norm (often called drastic) is used. Necessary and sufficient conditions are presented under which the monotone eigenspace (the set of all monotone eigenvectors) of a given matrix is non-empty and, in the positive case, the structure of the monotone eigenspace is described. These structural results are then extended to the whole eigenspace using permutations of rows and columns. The work is a follow up to earlier works of the authors in which the eigenspace of a max–min fuzzy matrix and/or the eigenspace of a max-Łukasiewicz fuzzy matrix has been described as a union of intervals.
Keywords
Drastic triangular norm , (max , ?drast)-algebra , Fuzzy matrix , Eigenvector
Journal title
FUZZY SETS AND SYSTEMS
Serial Year
2014
Journal title
FUZZY SETS AND SYSTEMS
Record number
1601995
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