Abstract
The purpose of this paper is to present some results on the effects of parametric perturbations on the Lyapunov exponents of discrete time-varying linear systems. We fix our attention on the greatest and smallest exponents.
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References
Amato, F., Mattei, M., Pironti, A.: A note on quadratic stability of uncertain linear discrete-time systems. IEEE Trans. Automat. Control 43(2), 227â229 (1998)
Amato, F., Mattei, M., Pironti, A.: A robust stability problem for discrete-time systems subject to an uncertain parameter. Automatica 34(4), 521â523 (1998)
Amato, F., Ambrosino, R., Ariola, M., Merola, A.: A Procedure for Robust Stability Analysis of Discrete-Time Systems via Polyhedral Lyapunov Functions. In: Proceedings of the 2008 American Control Conference, Seattle, Washington, USA (2008)
Arnold, L., Pierre Eckmann, J., Crauel, H. (eds.): Lyapunov Exponents, Proceedings of a Conference, held in Oberwolfach, Germany, May 28-June 2, 1990. Lecture Notes in Mathematics, vol. 1486. Springer, Berlin (1991)
Barabanov, E.A., Vishnevskaya, O.G.: Exact bounds of Liapunovâs exponents for linear differential perturbed systems with integrally restricted perturbation matrices on the semiaxis. Dokl. Akad. Nauk Belarusi 41(5), 29â34 (1997)
Barreira, L., Pesin, Y.: Lyapunov exponents and Smooth Ergodic Theory. Univ. Lecture Ser., vol. 23. Amer. Math Soc., Providence (2002)
Barreira, L., Valls, C.: Stability theory and Lyapunov regularity. Journal of Differential Equations 232(2), 675â701 (2007)
Berger, M.A., Wang, Y.: Bouned semigroups of matrices. Linear Algebra Appl. 166, 21â27 (1992)
Blondel, V.D., Tsitsiklis, J.N.: When is a pair of matrices mortal? Inform. Process. Lett. 63, 283â286 (1997)
Blondel, V.D., Tsitsiklis, J.N.: Complexity of stability and controllability of elementary hybrid systems. Automatica 35, 479â489 (1999)
Blondel, V.D., Tsitsiklis, J.N.: Boundedness of all products of a pair of matrices is undecidable. Systems and Control Letters 41(2), 135 (2000)
Bylov, B.F., Vinograd, R.E., Grobman, D.M., Nemytskii, V.V.: Theory of Lyapunov Exponents and Its Applications to Stability Theory, Moscow, Nauka (1966) (in Russian)
Czornik, A.: On the generalized spectral subradius. Linear Algebra and Its Applications 407(1-3), 242â248 (2005)
Czornik, A., Jurgas, P.: Some properties of the spectral radius of a set of matrices. International Journal of Applied Mathematics and Computer Science 16(2), 183â188 (2006)
Czornik, A., Jurgas, P.: Set of possible values of maximal Lyapunov exponents of discrete time-varying linear system. Automatica 44(2), 580â583 (2008)
Czornik, A., Nawrat, A.: On the regularity of discrete linear systems. Linear Algebra and Its Applications 432(11), 2745â2753 (2010)
Czornik, A., Nawrat, A.: On the Sigma Exponent of Discrete Linear Systems. IEEE Transactions on Automatic Control 55(6), 1511â1515 (2010)
Czornik, A., Nawrat, A., Niezabitowski, M.: On the stability of Lyapunov exponents of discrete linear systems. Submitted for publication in IEEE Transactions on Automatic Control (2012)
Dai, X.: Exponential stability of nonautonomous linear differential equations with linear perturbations by Liao methods. Journal of Differential Equations 225, 549â572 (2006)
Daubechies, I., Lagarias, J.C.: Sets of matrices all infinite products of which converge. Linear Algebra Appl. 161, 227â263 (1992)
Daubechies, I., Lagarias, J.C.: Corrigendum/addendum to: Sets of matrices all infinite products of which converge. Linear Algebra Appl. 327, 69â83 (2001)
Demidovich, V.B.: Stability criterion for difference equations. Diff. Uravneniya 5(7), 1247â1255 (1969) (in Russian)
Elsner, L.: The generalized spectral radius theorem: An analytic-Geometric proof. Linear Algebra Appl. 220, 151â159 (1995)
Gripenberg, G.: Computing the join spectral radius. Linear Algebra Appl. 234, 43â60 (1996)
Guglielmi, N., Wirth, F., Zennaro, M.: Complex Polytope Extremality Results for Families of Matrices. Siam J. Matrix Anal. Appl. 27(3), 721â743 (2005)
Gurvits, L.: Stability of discrete linear inclusion. Linear Algebra Appl. 231, 47â85 (1995)
Hinrichsen, D., Prichard, A.J.: Stability radii of Linear Systems. Systems and Control Letters 7, 1â10 (1986)
Hinrichsen, D., Prichard, A.J.: Mathematical systems theory. I. Applied Mathematics, vol. 48. Springer, Berlin (2005)
Izobov, N.A.: Exponential Stability by the Linear Approximation. Differential Equations 37(8) (2001)
Izobov, N.A.: The Higher Exponent of a Linear System with Exponential Perturbations. Differential Equations 5(7), 1186â1192 (1969)
Izobov, N.A.: The Higher Exponent of a System with Perturbations of Order Higher Than One. Vestn. Bel. Gos. Unta. Ser. IÂ (3), 6â9 (1969) (in Russian)
Izobov, N.A.: Vvedenie v teoriyu pokazatelei Lyapunova (Introduction to the Theory of Lyapunov Exponents). Belarus. Gos. Univ., Minsk (2006) (in Russian)
Jury, E.I.: Robustness of a discrete system. Automation and Remote Control 51, 571â592 (1990)
Kolla, S.R., Yedavalli, R.K., Farison, J.B.: Robust stability bounds on time-varying perturbations for state-space models of linear discrete-time systems. International Journal of Control 50, 151â159 (1989)
Kryzhevich, S.G.: Estimates of Exponents of Linear Nonhomogeneous Systems via the Grobman Improperness Coefficient. Differential Equations 38(8), 1208â1210 (2002)
Kuznetsov, N.V., Leonov, G.A.: Counterexample of Perron in the Discrete Case. Izv. RAEN, Diff. Uravn. 5, 71 (2001)
Kuznetsov, N.V., Leonov, G.A.: Stability Criteria by the First Approximation for Discrete Nonlinear Systems (part I), Vestnik St. Petersburg University. Mathematics 39(2), 55â63 (2005)
Kuznetsov, N.V., Leonov, G.A.: Stability Criteria by the First Approximation for Discrete Nonlinear Systems (part II), Vestnik St. Petersburg University. Mathematics 39(3), 30â42 (2005)
Lima, R., Rahibe, M.: Exact Lyapunov exponent for infinite products of random matrices. Journal of Physics A: Mathematical and General 27(10), 3427â3437 (1994)
Lyapunov, A.M.: General problem of stability of motion, Collected works. Izdat. Akad. Nauk SSSRÂ 2 (1956) (in Russian)
Leonov, G.A.: Lyapunov exponents and problems of linearization. From stability to chaos. St. Petersburg University Press (1997)
Maesumi, M.: Calculating joint spectral radius of matrices and Holder exponent of wavelets. In: Chui, C.K., Schumaker, L.L. (eds.) Approximation Theory IX. World Scientific, Singapore (1988)
Makarov, E.K., Marchenko, I.V., Semerikova, N.V.: On an Upper Bound for the Higher Exponent of a Linear Differential System with Integrable Perturbations on the Half-Line. Differents. Uravn. 41(2), 215â224 (2005)
Makarov, E.K., Marchenko, I.V.: On an Algorithm for Constructing an Attainable Upper Boundary for the Higher Exponent of Perturbed Systems. Differential Equations 41(12), 1621â1634 (2005)
Malkin, I.G.: Theory of stability of motion, Nauka, Moscow (1966) (in Russian)
Mane, R.: Lyapunov exponents and stable manifolds for compact transformations. In: Geometric Dynamics. Lecture Notes in Math., vol. 1007, pp. 522â577. Springer (1983)
Millionshchikov, V.M.: A proof of attainability of central exponents of linear systems. Sibirskii Matematicheskii Zhurnal 10, 99â104 (1969)
Molchanov, A.P., Liu, D.: Robust Absolute Stability of Time-Varying Nonlinear Discrete Systems. IEEE Transactions on Automatic Control 49, 1129â1137 (2002)
Perron, O.: Ăber StabilitĂ€t und asymptotisches Verhalten des Integrale von Differentialgleichungssystemen. Mathematische Zeitschrift 31, 748â766 (1929)
Perron, O.: Die StabilitĂ€tsfrage bei Differentialgleichungen. Mathematische Zeitschrift 32(5), 702â728 (1930)
Gyori, I., Pituk, M.: The Converse of the Theorem on Stability by the First Approximation for Difference Equations. Nonlinear Analysis 47, 4635â4640 (2001)
Phat, V.N.: On the stability of time-varying systems. Optimization 45, 237â254 (1999)
Rota, G.C., Strang, G.: A note on the joint spectral radius. Inag. Math. 22, 379â381 (1960)
Shen, J.: Compactification of a set of matrices with convergent infinite products. Linear Algebra Appl. 311, 177â186 (2000)
Su, J.H., Fong, I.K.: New robust stability bounds of linear discrete-time systems with time-varying uncertainties. International Journal of Control 58, 1461â1467 (1993)
Wang, K., Michel, A.N., Liu, D.: Necessary and sufficient conditions for the Hurwitz and Schur stability of interval matrices. IEEE Transactions on Automatic Control 39, 1251â1255 (1994)
Wirth, F.: On the calculation of real time-varying stability radii. International Journal of Robust and Nonlinear Control 8, 1043â1058 (1998)
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Czornik, A., Nawrat, A., Niezabitowski, M. (2013). Lyapunov Exponents for Discrete Time-Varying Systems. In: Nawrat, A., Simek, K., Ćwierniak, A. (eds) Advanced Technologies for Intelligent Systems of National Border Security. Studies in Computational Intelligence, vol 440. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-31665-4_3
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DOI: https://doi.org/10.1007/978-3-642-31665-4_3
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