
doi: 10.1137/0322011
handle: 11573/30317
The authors consider some deterministic control problems where switching between various controls induces a given cost. Using the known relations between deterministic control problems, dynamic programming arguments, and viscosity solutions of Hamilton-Jacobi equations, the authors study this problem and, in particular, prove the uniqueness of the value functions as viscosity solutions of the associated system of first-order partial differential equations.
viscosity solutions, switching, Hamilton-Jacobi theories, Dynamic programming in optimal control and differential games, Boundary value problems for nonlinear first-order PDEs, Existence of generalized solutions of PDE, deterministic control, Hamilton-Jacobi equations
viscosity solutions, switching, Hamilton-Jacobi theories, Dynamic programming in optimal control and differential games, Boundary value problems for nonlinear first-order PDEs, Existence of generalized solutions of PDE, deterministic control, Hamilton-Jacobi equations
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