Parametric Solutions to the Generalized Discrete Yakubovich-Transpose Matrix Equation
From MaRDI portal
Publication:2930808
DOI10.1002/asjc.780zbMath1300.93111OpenAlexW1594736270MaRDI QIDQ2930808
Caiqin Song, Jianli Zhao, Xiao-dong Wang, Jun-E. Feng
Publication date: 19 November 2014
Published in: Asian Journal of Control (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/asjc.780
Related Items
Closed-form solutions to the nonhomogeneous Yakubovich-transpose matrix equation ⋮ New Finite Algorithm for Solving the Generalized Nonhomogeneous Yakubovich-Transpose Matrix Equation ⋮ The least squares solution of a class of generalized Sylvester-transpose matrix equations with the norm inequality constraint ⋮ An iterative algorithm for the least Frobenius norm least squares solution of a class of generalized coupled Sylvester-transpose linear matrix equations
Cites Work
- Hierarchical multi-innovation stochastic gradient algorithm for Hammerstein nonlinear system modeling
- Toward solution of matrix equation \(X=Af(X)B+C\)
- Gradient based and least squares based iterative algorithms for matrix equations \(AXB + CX^{T}D = F\)
- The solution of the equation \(XA+AX^T=0\) and its application to the theory of orbits
- Iterative solutions to coupled Sylvester-transpose matrix equations
- Iterative solutions to matrix equations of the form \(A_{i}XB_{i}=F_{i}\)
- Fault diagnosis in dynamic systems using analytical and knowledge-based redundancy - a survey and some new results
- Closed-form solutions to the nonhomogeneous Yakubovich-conjugate matrix equation
- Spectral properties of sums of certain Kronecker products
- Least squares solution with the minimum-norm to general matrix equations via iteration
- Iterative algorithms for solving the matrix equation \(AXB + CX^{T}D = E\)
- Gradient based iterative solutions for general linear matrix equations
- Least-squares solution with the minimum-norm for the matrix equation \(A^T XB + B^T X^T A = D\) and its applications
- A system of real quaternion matrix equations with applications
- The iterative solution of the matrix equation \(XA+BX+C=0\)
- Singular control systems
- Solution to matrix equation \(AV + BW = EVF\) and eigenstructure assignment for descriptor systems
- State covariance assignment problem with measurement noise: A unified approach based on a symmetric matrix equation
- Complete parametric approach for eigenstructure assignment in a class of second-order linear systems
- On solutions of matrix equation \(XF-AX=C\) and \(XF-A\widetilde{X}=C\) over quaternion field
- The solution to matrix equation \(AX+X^TC=B\)
- Iterative solutions of the generalized Sylvester matrix equations by using the hierarchical identification principle
- A system of four matrix equations over von Neumann regular rings and its applications
- Dynamic System Identification Using High-Order Hopfield-Based Neural Network (HOHNN)
- An explicit solution to polynomial matrix right coprime factorization with application in eigenstructure assignment
- Some matrix equations with applications†
- Robust fault detection using Luenberger-type unknown input observers-a parametric approach
- On Iterative Solutions of General Coupled Matrix Equations
- Further remarks on the Cayley-Hamilton theorem and Leverrier's method for the matrix pencil<tex>(sE - A)</tex>
- Eigenstructure assignment in descriptor systems
- Geometric structure and feedback in singular systems
- Assigning controllability and observability Gramians in feedback control
- Liapunov and covariance controllers
- Hierarchical identification of lifted state-space models for general dual-rate systems
- Explicit solutions to the quaternion matrix equationsX−AXF=CandX−A[XtildeF=C]
- Eigenstructure assignment in descriptor systems via output feedback: A new complete parametric approach
- Hierarchical least squares identification methods for multivariable systems
- Gradient based iterative algorithms for solving a class of matrix equations
- Solutions of the equation AV+BW=VF and their application to eigenstructure assignment in linear systems
- A real quaternion matrix equation with applications
- Two/Infinity Norm Criteria Resolution of Manipulator Redundancy at Joint‐Acceleration Level Using Primal‐Dual Neural Network
- Observer-based Adaptive fuzzy control of time-delay uncertain nonlinear systems
This page was built for publication: Parametric Solutions to the Generalized Discrete Yakubovich-Transpose Matrix Equation
