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On an infinite dimensional linear-quadratic problem with fixed endpoints: The continuity question

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Abstrakty
EN
In a Hilbert space setting, necessary and sufficient conditions for the minimum norm solution u to the equation Su = Rz to be continuously dependent on z are given. These conditions are used to study the continuity of minimum energy and linear-quadratic control problems for infinite dimensional linear systems with fixed endpoints.
Twórcy
  • Department of Applied Sciences, Collegium Mazovia, ul. Sokołowska 116, 08-110 Siedlce, Poland
Bibliografia
  • [1] Athans, M. (1971). The role and use of the stochastic linear-quadratic-Gaussian problem in control system design, IEEE Transactions on Automatic Control, AC-16(6): 529–552.
  • [2] Aubin, J.-P. (2000). Applied Functional Analysis, Wiley, New York, NY.
  • [3] Balakrishnan, A.V. (1981). Applied Functional Analysis, Springer, New York, NY.
  • [4] Brockett, R.F. (1970). Finite-Dimensional Linear Systems, Wiley, New York, NY.
  • [5] Chow, G.P. (1976). Analysis and Control of Dynamic Economic Systems, Wiley, New York, NY.
  • [6] Corless, M.J. and Frazho, A.E. (2003). Linear Systems and Control. An Operator Perspective, Marcel Dekker, New York, NY.
  • [7] Curtain, R.F. (1984). Linear-quadratic control problem with fixed endpoints in infinite dimensions, Journal of Optimization Theory and Its Applications 44(1): 55–74.
  • [8] Curtain, R.F. and Pritchard A.J. (1978). Infinite-Dimensional Linear Systems Theory, Springer, Berlin.
  • [9] Curtain, R.F. and Zwart H. (1995). An Introduction to Infinite-Dimensional Linear Systems Theory, Springer, New York, NY.
  • [10] Douglas, R.G. (1966). On majorization, factorization, and range inclusion of operators on Hilbert space, Proceedings of the American Mathematical Society 18(2): 413–415.
  • [11] Emirsajłow, Z. (1989). Feedback control in LQCP with a terminal inequality constraint, Journal of Optimization Theory and Applications 62(3): 387–403.
  • [12] Evans, L.C. (2010). Partial Differential Equations, American Mathematical Society, Providence RI.
  • [13] Federico, S. (2011). A stochastic control problem with delay arising in a pension fund model, Finance and Stochastics 15(3): 421–459.
  • [14] Fuhrmann, P.A. (1972). On weak and strong reachability and controllability of infinite-dimensional linear systems, Journal of Optimization Theory and Its Applications 9(2): 77–89.
  • [15] Kandilakis, D. and Papageorgiou, N.S. (1992). Evolution inclusions of the subdifferential type depending on a parameter, Commentationes Mathematicae Universitatis Carolinae 33(3): 437–449.
  • [16] Kendrick, D.A. (1981). Stochastic Control for Economic Models, McGraw-Hill, New York, NY.
  • [17] Kobayashi, T. (1978). Some remarks on controllability for distributed parameter systems, SIAM Journal on Control and Optimization 16(5): 733–742.
  • [18] Laurent, P.-J. (1972). Approximation et Optimisation, Hermann, Paris.
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  • [20] Luenberger, D.G. (1969). Optimization by Vector Space Methods, Wiley, New York, NY.
  • [21] Papageorgiou, N.S. (1991). On the dependence of the solutions and optimal solutions of control problems on the control constraint set, Journal of Mathematical Analysis and Applications 158(2): 427–447.
  • [22] Porter, W.A. (1966). Modern Foundations of System Engineering, Macmillan, New York, NY.
  • [23] Przyłuski, K.M. (1981). Remarks on continuous dependence of an optimal control on parameters, in O. Moeschlin and D. Pallaschke (Eds.), Game Theory and Mathematical Economics, North-Holland, Amsterdam, pp. 333–337.
  • [24] Rolewicz, S. (1987). Functional Analysis and Control Theory. Linear Systems, PWN, Warsaw, (in Polish).
  • [25] Sent, E.-M. (1998). The Evolving Rationality of Rational Expectations: An Assessment of Thomas Sargent’s A-chievements, Cambridge University Press, Cambridge.
  • [26] Triggiani, R. (1975a). A note on the lack of exact controllability for mild solutions in Banach spaces, SIAM Journal on Control and Optimization 15(3): 407–411.
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  • [28] Triggiani, R. (1976). Extensions of rank conditions for controllability and observability to Banach spaces and unbounded operators, SIAM Journal on Control and Optimization 14(2): 313–338.
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Bibliografia
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