In this paper we obtain optimal control problems governed by variational inequalities of obstacle type for infinite order with finite dimension. We obtain the optimality condition under classical assumption using a dual regularized functional, to interpret the variational inequality we use a penalty method to get first - order conditions.

Variational inequalities, optimal control, infinite order, penalization method.

V. Barbu, Optimal control of variational inequalities, Research Notes in mathematics, 100 pitman, Boston, 1984.

V. Barbu,Analysis and control of non linear infinte dimensional systems, math in science and engineering ,vol.190,Academic Press 1993.

M. Bergounioux, H. Dietrich, Optimal control of problems governed by obstacle type variationsl inequalities: a dual regularization penalization approach, Vol. 5, no. 2, (1997), pp. 32-351.

M. Bergounioux, Optimal control of an obstacle problem,Applied mathematics and optimazation ,36,pp.147-172,1997.

M. Bergounioux, Optimal control of problems governed by abstract elliptic variational inequalities with state constraints siam journal on control and optimization,vol.36,n 1,January 1998.

Ju. A. Dubinskii, Some imbedding theorems for Sobolev spaces of infinite order, Soviet Math. Dokl., Vol. 19, (1978), pp. 1271-1274.

S.A. El.zahaby and GH.H. Mostafa.Optimal control of variational inequalities of infinite order,journal of mathematical egyptian society

,2005,pp.99-106.

I. M. Gali, Optimal control of system governed by elliptic operators of

infinite order, ordinary and partial differential equations, Proceedings,

Dundee, Lecture Notes in Mathematics, (1984), pp. 263-272.

I.M. Gali, and H.A. El-Saify, and S.A. El-Zahaby, Distributed Control

of a System Governed by Dirichlet and Neumann Problems for Elliptic

Equations of Infinite Order Proc. Of the International Conference

of Functional Differential System and Related topics III, Pland, 22-29,

(1983).

J. L. Lions and G. Stampacchia, Variational inequalities, Comm. Pure

Applied Math., Vol. 20, (1967), pp. 493-519.

F. Mignot, Control dans les inequations variationnelles elliptiques, J.

Funct. Anal., Vol. 22, (1976), pp. 130-185.

F. Mignot and J. P. Puel, Optimal control in some vriational inequalities, SIAM J. Control and Optimization, Vol. 22, (1984), pp. 466-476.

E. Zeidlar, Nonlinear functional analysis and its applications, Vol. IIB: Nonlinear Monotone Operators, Springs, Berlin 1992.