|Title:||Feedback invariants of series connected systems||Journal:||Linear Algebra and Its Applications||Volume:||577||First page:||244||Last page:||269||Issue Date:||15-Sep-2019||Rank:||M21||ISSN:||0024-3795||DOI:||10.1016/j.laa.2019.04.031||Abstract:||
In this paper we study the possible feedback invariants of linear systems obtained as a result of series connections of two linear systems. We solve the problem in a generic case, and we conjecture general solution. We explore the role and importance of the Littlewood-Richardson coefficients in the solution.
|Keywords:||Carlson problem | Completion of matrices | Linear systems | Littlewood-Richardson coefficient||Publisher:||Elsevier||Project:||FCT, project ISFL-1-1431
Geometry and Topology of Manifolds, Classical Mechanics and Integrable Dynamical Systems
Geometry, Education and Visualization With Applications
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