\(\mathbb{C}[y]\) is a CA-ring and coefficient assignment is properly weaker than feedback cyclization over a PID
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Publication:1346187
DOI10.1016/0022-4049(93)00012-TzbMath0842.13016MaRDI QIDQ1346187
Wiland Schmale, Lee Klingler, James Brewer
Publication date: 24 January 1996
Published in: Journal of Pure and Applied Algebra (Search for Journal in Brave)
Feedback control (93B52) Principal ideal rings (13F10) Rings with straightening laws, Hodge algebras (13F50)
Related Items
A symmetric approach to cyclization for systems over \(\mathbb{C} [y\)] ⋮ When does the ring \(K[y\) have the coefficient assignment property?] ⋮ Coefficient assignability and a block decomposition for systems over rings ⋮ Feedback cyclization for rings with finite stable range ⋮ On feedback invariants for linear dynamical systems ⋮ Matrix cyclization over complex polynomials.
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