标题:
一类离散时间最优控制问题的一阶最优性条件First-Order Optimality Conditions for a Class of Discrete-Time Optimal Control Problems
作者:
杨小杭, 徐应涛, 张莹, 杜林岳
关键字:
压缩不动点定理, 控制参数化方法, 最优性条件Contraction Fixed Point Theorem, Control Parameterization Method, Optimality Condition
期刊名称:
《Advances in Applied Mathematics》, Vol.5 No.4, 2016-11-30
摘要:
本文对一类离散时间的控制问题,提出了存在唯一解的Lipschitz条件,并进一步地,引进控制参数化方法定义控制变量转化函数,将最优控制问题等价转化为非线性可微规划问题,得到了此类最优控制问题的一阶最优性条件。最后,给出两个算例用以验证如上提出的一阶最优性条件。
In this paper, we give the Lipschitz condition for a class of discrete-time control problems in which the system has unique solution. Further, we present the control variable transformation function by using the control parameterization method. As a result, the optimal control problem we are considering is converted to a nonlinear differentiable programming problem. Then we put forward a class of first-order optimality conditions for this optimal control problem. Finally, two examples are provided to demonstrate the effectiveness of the proposed first-order optimality conditions.