Optimal control problems have been widely met in all kinds of practical problems, such as, temperature control problems, air pollution control problems, Stokes flow control problems, electrochemical machining design problems, etc.

In this paper,we study adaptive finite element discretization schemes for an optimal control problem governed by elliptic PDE with an integral constraint for the state with Neumann-edge,with the constraints K = {y∈H~1(Ω):∫_((?)Ω)y≥γ}.

A novel numerical method for solving optimal control problems based on ordinary differential equations(ODE) or differential-algebra equations(DAE) was proposed.

In this paper,we introduce optimal control problems that are governed by integro-differential equations.

Superconvergence and recovery a posteriori error estimates of the finite element approximation for general convex optimal control problems are investigated in this paper.

In general, most of the optimal control problems that we are interested in can be symbolically written in the following form: (OCP)s.