The structure stability of periodic solutions for first-order uncertain dynamical systems
Release time:2021-04-04
Hits:
Indexed by:
期刊论文
First Author:
Dai, Rui
Correspondence Author:
Minghao Chen
Date of Publication:
2021-01-10
Journal:
FUZZY SETS AND SYSTEMS
Document Type:
J
Volume:
400
Page Number:
134-146
ISSN No.:
0165-0114
Key Words:
Fuzzy differential equation; Differential inclusion; Periodic solution;
Structural stability
Abstract:
This paper studies the structural stability of periodic solutions for first-order fuzzy differential equations (FDEs) understood as differential inclusions, i.e., first-order uncertain dynamical systems. The existence and uniqueness of periodic solutions for this first-order fuzzy problems have been obtained on general fuzzy number space. When the forcing function has specific perturbations, the structural stability of the periodic solutions are discussed by using the support function, the Dini Theorem and the Convergence Theorem in the differential inclusion theory. (C) 2020 Elsevier B.V. All rights reserved.
Translation or Not:
no
