Three-dimensional feedback cyclization over \({\mathbb{C}}[y]\)
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Publication:1823210
DOI10.1016/0167-6911(89)90041-8zbMath0679.93028OpenAlexW1981596847MaRDI QIDQ1823210
Publication date: 1989
Published in: Systems \& Control Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0167-6911(89)90041-8
Controllability (93B05) Linear systems in control theory (93C05) Algebraic methods (93B25) General commutative ring theory (13A99)
Related Items (7)
Cyclizable matrix pairs over \(\mathbb C[x\) and a conjecture on Toeplitz pencils] ⋮ \(\mathbb{C}[y\) is a CA-ring and coefficient assignment is properly weaker than feedback cyclization over a PID] ⋮ A symmetric approach to cyclization for systems over \(\mathbb{C} [y\)] ⋮ When does the ring \(K[y\) have the coefficient assignment property?] ⋮ Feedback cyclization for rings with finite stable range ⋮ Matrix cyclization over complex polynomials. ⋮ A note on feedback cyclicity of \(\mathbb{C} [Y\)]
Cites Work
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- Pole assignability in polynomial rings, power series rings, and Prüfer domains
- New results on pole-shifting for parametrized families of systems
- Remarks on the pole-shifting problem over rings
- Linear multivariable control. A geometric approach
- Ring models for delay-differential systems
- Polynomial rings over arbitrary fields in two or more variables are not pole assignable
- Feedback cyclization over certain principal ideal domains
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