Zobrazeno 1 - 10
of 22
pro vyhledávání: '"Yao-Lin Jiang"'
Autor:
Cheng Chen, Yao-Lin Jiang
Publikováno v:
Computers & Mathematics with Applications. 75:2978-2988
The conformable fractional derivative was proposed by R. Khalil et al. in 2014, which is natural and obeys the Leibniz rule and chain rule. Based on the properties, a class of time-fractional partial differential equations can be reduced into ODEs us
Publikováno v:
Neurocomputing. 214:233-241
This paper investigates a coupled system of fractional-order differential equations on network with feedback controls (CSFDENFCs). By using the contraction mapping principle, Lyapunov method, graph theoretic approach and inequality techniques, some s
Autor:
Yao-Lin Jiang, Xiao-Li Ding
Publikováno v:
Communications in Nonlinear Science and Numerical Simulation. 30:139-150
This paper presents a new windowing waveform relaxation method for time-fractional differential equations. Unlike the classical case, the proposed windowing method uses the history part of the solution at each window. Second, it is the first time tha
Publikováno v:
Optik. 126:5771-5776
In this paper, we integrate impulsive control and adaptive control methods, based on the stability theory of impulsive differential equations, synchronization of uncertain complex networks with nonidentical topological structures is investigated. By
Publikováno v:
Applied Mathematics and Computation. 270:269-277
This paper investigates the global Mittag–Leffler stability of coupled system of fractional-order differential equations on network (CSFDEN). By using graph theory and the Lyapunov method, we provide a method for constructing a global Lyapunov func
Autor:
Cheng Chen, Yao-Lin Jiang
Publikováno v:
Communications in Nonlinear Science and Numerical Simulation. 26:24-35
In this paper we deal with two classes of fractional partial differential equation: n order linear fractional partial differential equation and nonlinear fractional reaction diffusion convection equation, by using the Lie group analysis method. The i
Autor:
Yao-Lin Jiang, Xiao-Li Ding
Publikováno v:
Fractional Calculus and Applied Analysis. 17:585-604
The waveform relaxation method has been successfully applied into solving fractional ordinary differential equations and fractional functional differential equations [11, 5]. In this paper, the waveform relaxation method is further used to solve frac
Autor:
Jun Liu, Yao-Lin Jiang
Publikováno v:
Applied Mathematics and Computation. 219:11460-11470
In this paper, we consider a numerical method for linear functional integro-differential equations with pantograph delays. To deal with the pantograph delays, we introduce a geometrically increasing mesh, and propose a new kind of Runge-Kutta methods
Autor:
Xiao-Li Ding, Yao-Lin Jiang
Publikováno v:
Fractional Calculus and Applied Analysis. 16:573-594
In this paper, we use waveform relaxation method to solve fractional functional differential equations. Under suitable conditions imposed on the so-called splitting functions the convergence results of the waveform relaxation method are given. Delay
Publikováno v:
Mathematical and Computer Modelling of Dynamical Systems. 18:223-241
In this article, we present a model-order reduction (MOR) approach for a large-scale linear differential-algebraic equation (DAE) system. This MOR approach is accomplished in two steps: First, by applying an -embedding method, we approximate a DAE sy