DocumentCode
477681
Title
Convergence of Powers of a Matrix over Distributive Lattice Under the •-+ Compositions
Author
Chen, Gui-ying
Author_Institution
Sch. of Math. Sci., Liaocheng Univ., Liaocheng
Volume
1
fYear
2008
fDate
18-20 Oct. 2008
Firstpage
235
Lastpage
237
Abstract
In this paper, matrices with ldr- + compositions over a distributive lattice are considered in terms of the principal diagonal elements, and several sufficient condition for an n times n matrix with ldr- + compositions over a distributive lattice to converge is given. Partial results obtained in this paper are generalized from fuzzy matrices with min-max compositions discussed in [3].
Keywords
fuzzy set theory; matrix algebra; minimax techniques; distributive lattice; fuzzy matrices; min-max compositions; principal diagonal elements; Convergence; Fuzzy systems; Lattices; Mathematics; Minimax techniques; Sufficient conditions; column diagonally recessive; converge; row diagonally recessive;
fLanguage
English
Publisher
ieee
Conference_Titel
Fuzzy Systems and Knowledge Discovery, 2008. FSKD '08. Fifth International Conference on
Conference_Location
Shandong
Print_ISBN
978-0-7695-3305-6
Type
conf
DOI
10.1109/FSKD.2008.403
Filename
4665975
Link To Document