Fractal Sets in Control Systems

Article Contents

Article Navigation > Applied Mathematics and Mechanics > 1993 > 14(8): 699-706

Cheng Dai-zhan. Fractal Sets in Control Systems[J]. Applied Mathematics and Mechanics, 1993, 14(8): 699-706.

Citation:

Cheng Dai-zhan. Fractal Sets in Control Systems[J]. Applied Mathematics and Mechanics, 1993, 14(8): 699-706.

Citation:

Cheng Dai-zhan. Fractal Sets in Control Systems[J]. Applied Mathematics and Mechanics, 1993, 14(8): 699-706.

Lab, of Managmeni, Decision and Information, Academia Sinica, Institute of Systems Science, Academia Sinica, Beijing

[1]	Wonham,M.H.,Linear Multivariable Control:A Geometric Approach,Springer-Verlag,Berlin(1979).
[2]	Hermann,R.and A.J.Krener,Nonlinear controllability and observability,IEEE Trans.Aut.Contr.,AC-22(1977),728-740.
[3]	Falconer,K.J.,The Geometry of Fractal Sets,Cambridge,New York(1985).
[4]	Paladin,G.and A.Vulpiani,Anomalous scaling laws in multifractal objects,Physical Reports(Review Section of Physics Letters),156,4(1987),147-225.
[5]	Thompson,J.M.T.and H.B.Stewart,Nonlinear Dynamics and Chaos,Geometrical Methods for Engineers and Scientists,John Wiley and Sons Ltd.(1986).
[6]	Massey,W.S.,Algebraic Topology:An Introduction,Springer-Verlag(1987).