In this paper, the optimal control problem is governed by weak coupled parabolic PDEs and involves pointwise state and control constraints. We use measure theory method for solving this problem. In order to use the weak solution of problem, first problem has been transformed into measure form. This problem is reduced to a linear programming problem. Then we obtain an optimal measure which is approximated by a finite combination of atomic measures. We find piecewise-constant optimal control functions which are an approximate control for the original optimal control problem.
In this paper, we propose to define the concept of family of local atoms and
then we generalize this concept to the atomic system for operator in Banach
spaces by using semi-inner product. We also give a characterization of atomic
systems leading to obtain new frames. In addition, a reconstruction formula is
obtain. Next, some new results are established. The characterization of atomic
systems allows us to state some results for sampling theory in semi-inner
product reproducing kernel Banach spaces. Finally, having used frame operator
in Banach spaces, new perturbation results are established
A generalization of the quotient integral formula is presented and some of its properties are investigated. Also the relations between two function spaces related to the spacial homogeneous spaces are derived by using general quotient integral formula. Finally our results are supported by some examples.
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