Optimal control of processes governed by partial differential equations part II: Vibrations

This paper examines a theory of optimal control of chemical reactors governed by a system of partial differential equations linked by a second non-linear member and where the control variable is only present in the boundary conditions. An integral transformation procedure of the mathematical model a

Geometric convergence rate a b s t r a c t A domain decomposition method (DDM) is presented to solve the distributed optimal control problem. The optimal control problem essentially couples an elliptic partial differential equation with respect to the state variable and a variational inequality with

This paper concerns about necessary conditions for optimal control problems governed by some semilinear parabolic di erential equations, which may be non-well posed. The two-point boundary (time variable) state constraint involves. The control set may be non-convex.