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Moduli and canonical forms for linear dynamical systems. II: The topological case. (English) Zbl 0396.54037


MSC:

54H20 Topological dynamics (MSC2010)
37-XX Dynamical systems and ergodic theory
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[1] M. Hazewinkel, R. E. Kalman,Mobuli and Canonical Forms for Linear Dynamical Systems (to appear; a Preliminary Version of this is available as report 7504, Econometric Inst., Erasmus University, Rotterdam, 1975).
[2] M. Hazewinkel, R. E. Kalman, On Invariants, Canonical Forms and Moduli for Linear, Constant, Finite Dimensional, Dynamical Systems, In: Proc. CNR-CISM symposium on ”Algebraic System Theory”, Udine, 1975,Lect. Notes Economics Math. Syst. Theory 131, 48–60, Springer-Verlag, Berlin, Heidelberg, New York, 1976.
[3] R. E. Kalman, P. L. Falb, M. A. Arbib,Topics in Mathematical Systems Theory, McGraw-Hill, New York, 1969. · Zbl 0231.49001
[4] N. E. Steenrod,The Topology of Fibre Bundles, Princeton Univ. Press, Princeton, N.J., 1951. · Zbl 0054.07103
[5] M. Hazewinkel,Moduli and canonical Forms for Linear Dynamical Systems III: The algebraicgeometic case. (To appear. Proc. Inst./Sem. on Diff. Geometry for Control Engineers. Ames Research Centre (NASA), June/July 1976; a preliminary version is available as report 7610, Econometric Inst., Erasmus Univ. Rotterdam), to be published: Math. Sci. Press.
[6] C. Byrnes, N. E. Hurt, On the Moduli of Linear Dynamical Systems, to appear,Advances in Mathematics.
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