Title :
A Parameterized Nonlinear Programming Approach to Solve Matrix Games With Payoffs of I-Fuzzy Numbers
Author :
Deng-Feng Li ; Jia-Cai Liu
Author_Institution :
Sch. of Econ. & Manage., Fuzhou Univ., Fuzhou, China
Abstract :
The aim of this paper is to develop a new methodology for solving matrix games with payoffs of Atanassov´s intuitionistic fuzzy (I-fuzzy) numbers. In this methodology, we define the concepts of I-fuzzy numbers and the value-index and ambiguity-index and develop a difference-index-based ranking method, which is proven to be a total order. By doing this, the parameterized nonlinear programming models are derived from a pair of auxiliary I-fuzzy mathematical programming models, which are used to determine solutions of matrix games with payoffs of I-fuzzy numbers. The validity and applicability of the models and method proposed in this paper are illustrated with a practical example.
Keywords :
formal logic; fuzzy set theory; game theory; matrix algebra; nonlinear programming; I-fuzzy number; ambiguity-index; auxiliary I-fuzzy mathematical programming models; difference-index-based ranking method; intuitionistic fuzzy number; matrix game; parameterized nonlinear programming approach; Educational institutions; Fuzzy logic; Games; Mathematical model; Mathematical programming; Programming; Uncertainty; Atanassov´s intuitionistic fuzzy (I-fuzzy) set; Fuzzy matrix game; Fuzzy set; fuzzy mathematical programming; fuzzy matrix game; fuzzy set; ranking method of fuzzy quantities; tanassov’s intuitionistic fuzzy (I-fuzzy) set;
Journal_Title :
Fuzzy Systems, IEEE Transactions on
DOI :
10.1109/TFUZZ.2014.2333065
