论文信息 - An Iterative Method for a Class of Generalized Global Dynamical System Involving Fuzzy Mappings in Hilbert Spaces

An Iterative Method for a Class of Generalized Global Dynamical System Involving Fuzzy Mappings in Hilbert Spaces

This paper presents a class of generalized global dynamical system involving (H,η) set-valued monotone mappings and a set-valued function induced by a closed fuzzy mapping in Hilbert spaces. By using the resolvent operator technique and Nadler fixed-point theorem, we prove the equilibrium point set is not empty and closed. Furthermore, we develop a new iterative scheme which generates a Cauchy sequence strongly converging to an equilibrium point.

[1] Terry L. Friesz,et al. Day-To-Day Dynamic Network Disequilibria and Idealized Traveler Information Systems , 1994, Oper. Res..

[2] M. Molla,et al. Conjugate Effects of Heat and Mass Transfer on Natural Convection Flow Across an Isothermal Horizontal Circular Cylinder with Chemical Reaction , 2007 .

[3] Yunzhi Zou,et al. An Iterative Method for Quasi-Variational-Like Inclusions with Fuzzy Mappings , 2006, RSKT.

[4] Anna Nagurney,et al. Dynamical systems and variational inequalities , 1993, Ann. Oper. Res..

[5] Lotfi A. Zadeh,et al. Fuzzy Sets , 1996, Inf. Control..

[6] Jun Wang,et al. On the Stability of Globally Projected Dynamical Systems , 2000 .

[7] S. Nadler. Multi-valued contraction mappings. , 1969 .

[8] N. Huang,et al. A new system of variational inclusions with (H, η )-monotone operators in hilbert spaces , 2005 .

[9] A. Nagurney,et al. On the stability of projected dynamical systems , 1995 .