An algebraic method to determine the common divisor, poles and transmission zeros of matrix transfer functions
From MaRDI portal
Publication:4173245
DOI10.1080/00207727808941751zbMath0391.93007OpenAlexW2087439748MaRDI QIDQ4173245
No author found.
Publication date: 1978
Published in: International Journal of Systems Science (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207727808941751
Lua error in Module:PublicationMSCList at line 37: attempt to index local 'msc_result' (a nil value).
Related Items (2)
Generalized matrix Euclidean algorithms for solving diophantine equations and associated problems ⋮ The generalized matrix continued-fraction descriptions and their application to model simplification†
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Properties and calculation of transmission zeros of linear multivariable systems
- Matrix continued fraction expansion and inversion by the generalized matrix Routh algorithm
- On the inversion of matrix Routh array
- Minimal realizations of transfer-function matrices by means of matrix continued fraction
- The role of transmission zeros in linear multivariable regulators
- A method for computing invariant zeros and transmission zeros of invertible systems
- Geometric approach to analysis and synthesis of system zeros Part 1. Square systems
- The exact model matching of linear multivariable systems
This page was built for publication: An algebraic method to determine the common divisor, poles and transmission zeros of matrix transfer functions
