主要论文著作

  • Kang-Li Xu, Zhi-Xia Yang, and Yao-Lin Jiang, Order-reduced models based on two sides techniques for input-output systems governed by differential-algebraic equations, International Journal for Multiscale Computational Engineering, Vol. 13, No. 3, pp. 219-230, 2015. 
  • Kang-Li Xu, Yao-Lin Jiang, and Zhi-Xia Yang, H2 order-reduction for bilinear systems based on Grassmann manifold, Journal of the Franklin Institute--Engineering and Applied Mathematics, Vol. 352, No. 10, pp. 4467-4479, 2015. 
  • Kang-Li Xu and Yao-Lin Jiang, An approach to H_{2, \omega} model reduction on finite interval for bilinear systems, Journal of the Franklin Institute--Engineering and Applied Mathematics, Vol. 354, No. 16, pp. 7429-7443, 2017.
  • Kang-Li Xu and Yao-Lin Jiang, H2 optimal model order reduction by two-sided technique on Grassmann manifold via the cross-gramian of bilinear systems, International Journal of Control, Vol. 90, No. 3, pp. 616-626, 2017. 
  • Yao-Lin Jiang and Kang-Li Xu, H2 optimal reduced models of general MIMO LTI systems via the cross Gramian on the Stiefel manifold, Journal of the Franklin Institute--Engineering and Applied Mathematics, Vol. 354, No. 8, pp. 3210-3224, 2017. 
  • Ping Yang, Kang-Li Xu*, and Yao-Lin Jiang, H2 model order reduction for bilinear systems based on the cross gramian, IMA Journal of Mathematical Control and Information, Vol. 34, No. 4, pp.1323-1338, 2017.
  • Kang-Li Xu and Yao-Lin Jiang, Reduced H2 optimal models via cross Gramian for continuous linear time-invariant systems, IET Circuits, Devices & Systems, Vol. 12, No. 1, pp. 25-32, 2018. 
  • Zhen Li, Yao-Lin Jiang, and Kang-Li Xu, Nonlinear model order reduction based on tensor decomposition and matrix product, IET Control Theory and Applications, Vol. 12, No. 16, pp. 2253-2262, 2018. 
  • Kang-Li Xu, Ping Yang, and Yao-Lin Jiang, Structure-preserving model reduction of second-order systems by Krylov subspace methods, Journal of Applied Mathematics and Computing, Vol. 58, No. 1-2, pp. 305-322, 2018. 
  • Kang-Li Xu and Yao-Lin Jiang, An unconstrained H2 model order reduction optimization algorithm based on the Stiefel manifold for bilinear systems, International Journal of Control, Vol. 92, No. 4, 950-959, 2019. 
  • Yao-Lin Jiang and Kang-Li Xu, Model order reduction of port-Hamiltonian systems by Riemannian modified Fletcher-Reeves scheme, IEEE Transactions on Circuits and Systems II, Vol. 66, No. 11, pp. 1825-1829, 2019. 
  • Yao-Lin Jiang, Kang-Li Xu, and Chun Yue Chen, Parameterized model order reduction for linear DAE systems via epsilon-embedding technique, Journal of the Franklin Institute-Engineering and Applied Mathematics, Vol. 356, No. 5, pp. 2901-2918, 2019.
  • Kang-Li Xu and Yao-Lin Jiang, Structure-preserving interval-limited balanced truncation reduced models for port-Hamiltonian systems, IET Control and Theory Applications, Vol. 14. No. 3, pp. 405-414, 2020. 
  • Zhao-Hong Wang, Yao-Lin Jiang, and Kang-Li Xu*, Time domain and frequency domain model order reduction for discrete time-delay systems, International Journal of Systems Science, Vol. 51, No. 12, pp. 2132-2149, 2020. 
  • Yao Huang, Yao-Lin Jiang, and Kang-Li Xu*, Model order reduction of RLC circuit system modeled by Port-Hamiltonian structure, IEEE Transactions on Circuits and Systems II, Vol. 69, No. 3, pp. 542-1546, 2022.
  • Yao-Lin Jiang and Kang-Li Xu, Riemannian modified Polak-Ribiere-Polyak conjugate gradient order reduced model by tensor techniques, SIAM Journal on Matrix Analysis and Applications, Vol. 41, No. 2, pp. 432-463, 2020. 
  • Yao-Lin Jiang and Kang-Li Xu, Frequency-limited reduced models for linear and bilinear systems on the Riemannian manifold, IEEE Transactions on Automatic Control, Vol. 66, No. 9, pp. 3938-3951, 2021. 
  • Zi-Xue Li, Yao-Lin Jiang, and Kang-Li Xu*, Riemannian optimization model order reduction method for general linear port-Hamiltonian systems, IMA Journal of Mathematical Control and Information, Vol. 39, No. 2, pp. 590-608, 2022.
  • Zhao-Hong Wang, Yao-Lin Jiang, and Kang-Li Xu*, Discrete orthogonal polynomials reduced models based on shift-transformation and discrete Walsh functions, International Journal of Systems Science, Vol. 53, No. 10, pp. 2045-2062, 2022.
  • Kang-Li Xu and Yao-Lin Jiang, Riemannian optimization approach to structure-preserving model order reduction of integral-differential systems on the product of two Stiefel manifolds, Journal of the Franklin Institute-Engineering and Applied Mathematics, Vol. 359, pp. 4307-4330, 2022.
  • Zhao-Hong Wang, Yao-Lin Jiang, and Kang-Li Xu*, Reduced-order modeling methods via bivariate discrete orthogonal polynomials for two-dimensional discrete state-delayed systems, Multidimensional Systems and Signal Processing, Vol. 34, No. 1, pp. 227-248, 2023.
  • Zhao-Hong Wang, Yao-Lin Jiang, and Kang-Li Xu*, Reduced-order state-space models for two-dimensional discrete systems via bivariate discrete orthogonal polynomials, Mathematics and Computers in Simulation, Vol. 212, No. 1, pp. 441-456, 2023.
  • Kang-Li Xu*, Yao-Lin Jiang, Zhen Li, Li Li, Model reduction of discrete time-delay systems based on Charlier polynomials and high-order Krylov subspaces, Linear Algebra and its Applications, Vol. 661, pp. 222-246, 2023.
  • Kang-Li Xu and Yao-Lin Jiang, Riemannian geometric-nonlinear conjugate gradient model order reduction of linear port-Hamiltonian systems on finite frequency intervals, IEEE Transactions on Automatic Control, Vol. 69, No. 5, pp. 3317-3324, 2024.