论文信息 - Hamiltonian dynamical systems for convex problems of optimal control: implications for the value function

Hamiltonian dynamical systems for convex problems of optimal control: implications for the value function

For fully convex problems of optimal control, the Hamiltonian dynamical system provides a global description of evolution of the subdifferentials of the value function from those of the initial cost. We employ this description and the convex structure of the problem to investigate the differentiability properties of the value function. Motivation is provided by questions of regularity of optimal feedback, the key ingredients of which the the value function, and by the fact that the Hamiltonian may lead to a reasonable dynamical system, even if the underlying control problem involves various constraints and penalties.

Rafal Goebel

[1] R. Rockafellar,et al. Generalized Conjugacy in Hamilton-Jacobi Theory for Fully Convex Lagrangians , 2002 .

[2] Grant N. Galbraith. Extended Hamilton--Jacobi Characterization of Value Functions in Optimal Control , 2000, SIAM J. Control. Optim..

[3] H. Frankowska,et al. CONJUGATE POINTS AND SHOCKS IN NONLINEAR OPTIMAL CONTROL , 1996 .

[4] Piermarco Cannarsa,et al. Some characterizations of optimal trajectories in control theory , 1991 .

[5] L. Berkovitz. Optimal feedback controls , 1989 .

[6] Yu. S. Ledyaev,et al. Nonsmooth analysis and control theory , 1998 .

[7] R. Tyrrell Rockafellar,et al. Convexity in Hamilton-Jacobi Theory I: Dynamics and Duality , 2000, SIAM J. Control. Optim..

[8] R. Rockafellar,et al. Generalized Hamiltonian equations for convex problems of Lagrange. , 1970 .

[9] C. Byrnes. On the Riccati Partial Differential Equation for Nonlinear Bolza and Lagrange Problems , 2002 .

[10] F. Clarke. Optimization And Nonsmooth Analysis , 1983 .

[11] R. Rockafellar,et al. Conjugate convex functions in optimal control and the calculus of variations , 1970 .

[12] R. Rockafellar. Linear-quadratic programming and optimal control , 1987 .