Article Outline
Keywords and Phrases
Introduction
Definitions
Turnpike Theorems for Terminal Functionals
Functional \( { \lim \inf_{t \to \infty u(x(t))} } \)
Functional \( { \lim \inf_{t \to \infty u(x(t),\dot{x}(t))} } \)
Turnpike Theorems for Integral Functionals
Convex Problems
Other Results
See also
References
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References
Dorfman R, Samuelson PA, Solow RM (1958) Linear Programming and Economic Analysis. McGraw Hill, New York
Filippov AF (1988) Differential Equations with Discontinuous Righthand Sides. Mathematics and its Applications (Soviet series). Kluwer, Dordrecht
Gale D (1967) On optimal development in a multisector economy. Rev Econ Stud 34:119
Gusev DE, Yakubovich VA (1983) Turnpike Theorem in the Problem of Continuous Optimization. Vestn Leningr Univ 1(2):2027
Gusev DE, Yakubovich VA (1983) Turnpike theorem in the problem of continuous optimization with phase restrictions. Syst Control Lett 3(4):221–226
Leizarowitz A (1985) Infinite horizon autonomous systems with unbounded cost. Appl Math Opt 13:19–43
Leizarowitz A (1989) Optimal trajectories on infinite horizon deterministic control systems. Appl Math Opt 19:11–32
Lyapunov AN (1983) Asymptotical Optimal Trajectories for Convex Mappings. Optim Model Syst Anal, VNIISI 9:74–80
Makarov VL, Rubinov AM (1977) Mathematical Theory of Economic Dynamics and Equilibria. Springer, New York
Mamedov MA (1985) Asymptotical optimal paths in models with environment pollution being taken into account. Optimization 36(53):101–112
Mamedov MA (1987) Asymptotical stability of optimal paths for some differential inclusions. In: On problems of uniformly approximations and asymptotical paths of dynamical systems. NGPI, Novosibirsk, pp 124–131
Mamedov MA (1992) Turnpike theorems in continuous systems with integral functionals. Russ Acad Sci Dokl Math 45(2):432–435
Mamedov MA (1993) Turnpike theorems for integral functionals. Russ Acad Sci Dokl Math 46(1):174–177
Mamedov MA, Pehlivan S (2001) Statistical cluster points and turnpike theorem in nonconvex problems. J Math Anal Appl 256:686–693
Mamedov MA (2003) Turnpike Theorem for Continuous-time Control Systems when Optimal Stationary Point is not unique. Abstr Appl Anal 2003(11):631–650
Mamedov MA, Borisov KY (1988) A simple model of economic grow and pollution control. Vestn Leningr Univ 5(5):120–124
McKenzie LW (1976) Turnpike theory. Econometrica 44:841–866
Panasyuk AI, Panasyuk VI (1986) Asymptotic turnpike optimization of control systems. Nauka i Technika, Minsk
Pehlivan S, Mamedov MA (2000) Statistical cluster points and turnpike. Optimization 48:93–106
Rockafellar RT (1973) Saddle points of Hamiltonian systems in convex problems of Lagrange. J Optim Theory Appl 12:367–390
Rockafellar RT (1976) Saddle points of Hamiltonian systems in convex problems having a nonzero discount rate. J Econ Theory 12:71–113
Scheinkman JA (1976) On optimal steady states of n-sector growth models when utility is discounted. J Econ Theory 12:11–30
Scheinkman JA (1979) Stability of regular equilibria and the correspondence principle for symmetric variational problems. Int Econ Rev 20:279–315
von Neumann J (1945–46) A Model of General Economic Equilibrium. Rev Econ Stud 13:19
Zaslavski A (2005) Turnpike Properties in the Calculus of Variations and Optimal Control. Nonconvex Optim Appl 80(22):396
Zelikina LF (1977) Multidimensional synthesis and the turnpike theorem in optimal control problems in economics. In: Arkin VI (ed) Probabilistic Methods of Control in Economics. Nauka, Moscow, pp 33–114
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Mammadov (Mamedov), M. (2008). Turnpike Theory: Stability of Optimal Trajectories . In: Floudas, C., Pardalos, P. (eds) Encyclopedia of Optimization. Springer, Boston, MA. https://doi.org/10.1007/978-0-387-74759-0_689
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DOI: https://doi.org/10.1007/978-0-387-74759-0_689
Publisher Name: Springer, Boston, MA
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