Zobrazeno 91 - 100
of 318
pro vyhledávání: '"Yao-Lin Jiang"'
Autor:
Yao-Lin Jiang, Kang-Li Xu
Publikováno v:
IET Circuits, Devices & Systems. 12:25-32
In this study, the authors focus on the problem of model order reduction (MOR) suitable for continuous linear time-invariant (LTI) systems. Specifically, for single-input single-output (SISO) LTI systems, a couple of MOR algorithms via the cross Gram
Autor:
Cheng Chen, Yao-Lin Jiang
Publikováno v:
Analysis and Mathematical Physics. 9:349-366
In this paper Lie symmetry analysis method is applied to study nonlinear generalized Zakharov system which is the coupled nonlinear system of Schrodinger equations. With the aid of Lie point symmetry, nonlinear generalized Zakharov system is reduced
Publikováno v:
Journal of Applied Mathematics and Computing. 58:305-322
In this paper, structure-preserving model reduction methods for second-order systems are investigated. By introducing an appropriate parameter, the second-order system is represented by a strictly dissipative realization and the $$H_{2}$$ norm of the
Publikováno v:
Chaos, Solitons & Fractals. 103:357-363
This paper investigates the synchronization problem of general complex networks with fractional-order dynamical nodes. Pinning state feedback controllers have been proved to be effective for synchronization control of fractional-order complex network
Autor:
Yao-Lin Jiang, Xiaolong Wang
Publikováno v:
International Journal of Control. 92:1033-1043
This paper presents an efficient model reduction method for time-delay systems in the time domain. We expand the systems under a Hermite polynomial basis and show that Hermite coefficients of the expansion are determined by a linear equation, thus ca
Autor:
Yao-Lin Jiang, Kang-Li Xu
Publikováno v:
International Journal of Control. 92:950-959
In this paper, the optimal H 2 model order reduction (MOR) problem for bilinear systems is explored. The orthogonality constraint of the cost function generated by the H 2 MOR error makes it is posed not on the Euclidean space, but can be discussed o
Publikováno v:
Applied Mathematics and Computation. 309:31-48
Two ADI solvers are given for 2D and 3D heat conduct equations at microscale.They are uniquely solvable.It is shown that they are of order 2 in time and order 4 in space.Numerical results exhibit the efficiency of the solvers. In this paper, a compac
SPH simulations of 3D dam-break flow against various forms of the obstacle: Toward an optimal design
Publikováno v:
Ocean Engineering. 229:108978
Dams are an important part of a country's infrastructure. After the dam breaks, the collision force of the water column, if severe enough, would incur a great deal of destruction and damage and needs to be concerned specially. In this work, 3D dam-br
Autor:
Yao-Lin Jiang, Yun-Bo Yang
Publikováno v:
Numerical Algorithms. 78:569-597
In this article, a full explicitly uncoupled variational multiscale (VMS) stabilization finite element method for solving the Darcy-Brinkman equations in double-diffusive convection is proposed. This method introduces three uncoupled VMS treatments f
Autor:
Yun-Bo Yang, Yao-Lin Jiang
Publikováno v:
Computational Methods in Applied Mathematics. 18:275-296
In this paper, a semi-discrete Galerkin finite element method is applied to the two-dimensional diffusive Peterlin viscoelastic model which can describe the unsteady behavior of some incompressible ploymeric fluids. For the derived semi-discrete fini