Zobrazeno 1 - 10
of 54
pro vyhledávání: '"Yung-Yih Lur"'
Publikováno v:
Journal of Inequalities and Applications, Vol 2017, Iss 1, Pp 1-25 (2017)
Abstract The purpose of this paper is to solve the hierarchical variational inequality with the constraint of a general system of variational inequalities in a uniformly convex and 2-uniformly smooth Banach space. We introduce implicit and explicit i
Externí odkaz:
https://doaj.org/article/417314c338894f5688489c6e63061d28
Autor:
Yung-Yih Lur, 盧永毅
87
This thesis consists of the following subjects ; (i) Develop a theory of products of Boolean matrices; (ii) Give a characterization of a Boolean contraction from the view point of products of Boolean matrices; (iii) Computation of the number
This thesis consists of the following subjects ; (i) Develop a theory of products of Boolean matrices; (ii) Give a characterization of a Boolean contraction from the view point of products of Boolean matrices; (iii) Computation of the number
Externí odkaz:
http://ndltd.ncl.edu.tw/handle/41249375899226830948
Publikováno v:
Fuzzy Sets and Systems. 440:21-41
This paper focuses on a classical problem of computing max-min inverse fuzzy relation. The resolution for the problem is useful for solving the well known problems of fuzzy abductive/backward reasoning. We propose a simple analytical method for findi
Publikováno v:
IEEE Transactions on Fuzzy Systems. 30:2337-2346
This paper is concerned with the problem of computing the approximate preinverses of a fuzzy matrix with max-product composition. Employing the weighted $L_1$ distance, a variety of evaluation functions are defined according to the preselected weight
Publikováno v:
Fuzzy Sets and Systems. 384:105-114
In the literature, the powers of a fuzzy matrix with max-arithmetic mean/convex combination of max-min and max-arithmetic mean/convex combination of max-product and max-min compositions have been studied. It turns out that the limiting behavior of th
Publikováno v:
Soft Computing. 22:1615-1622
An $$n \times n $$ interval matrix $${\mathcal {A}}= [\underline{A},\overline{A}]$$ is called to be a fuzzy interval matrix if $$0 \le \underline{A}_{ij} \le \overline{A}_{ij}\le 1$$ for all $$1 \le i, j \le n$$ . In this paper, we proposed the notio
Publikováno v:
Tamkang Journal of Mathematics. 48:345-364
In this paper, we consider an extension of well-posedness for a minimization problem to a class of generalized variational-hemivariational inequalities with perturbations in reflexive Banach spaces. We establish some metric characterizations for the
Publikováno v:
Fuzzy Sets and Systems. 289:157-163
In the literature, the powers of a fuzzy matrix with max-min/max-product/max Archimedean t-norm/max t-norm/max-arithmetic mean compositions have been studied. It turns out that the limiting behavior of the powers of a fuzzy matrix depends on the comp
Publikováno v:
Fuzzy Sets and Systems. 271:70-80
Fuzzy matrices have been proposed to represent fuzzy relations in finite universes. Various studies have evaluated the powers of a fuzzy matrix with max-min/max-product/max Archimedean t-norm/max t-norm/max-arithmetic mean compositions, indicating th
Publikováno v:
Fuzzy Optimization and Decision Making. 14:43-55
Several methods have been addressed to attain fuzzy-efficient solution for the multiple objective linear programming problems with fuzzy goals (FMOLP) in the literature. Recently, Jimenez and Bilbao showed that a fuzzy-efficient solution may not guar