Abstract
In this paper, we consider a class of optimal switching control problems with multiple time-delays and a cost on changing control and subject to terminal state constraints. A computational method involving three stages is developed to solve this class of optimal control problems. First, by parameterizing the control function with piecewise-constant functions, the optimal switching control problem is approximated by a sequence of finite-dimensional optimization problems, where the original switching times, the control heights and the control switching times are decision variables. Second, by introducing new variables, the total variation of the control variables is transformed into an equivalently smooth function. Third, we convert the constrained optimization problem into one only with box constraints by an exact penalty function method. The gradients of the cost functional are then derived, which can be combined with any gradient-based optimization method to determine the optimal solution. Finally, a numerical example is given to illustrate the effectiveness of the proposed algorithm.
Highlights
Switched systems are encountered in many real life applications, such as locomotives [5], bio-chemical reactors [9], and hybrid power systems [24]
The aim of this paper is to propose a computational method, which is applicable to a class of optimal control problems with the following characteristics: (i)
Our goal is to find an optimal switching time τ1 ∈ [0.1, 1.4] and an optimal control u : [0, 1.5] → [−5, 10] such that the cost functional
Summary
Switched systems are encountered in many real life applications, such as locomotives [5], bio-chemical reactors [9], and hybrid power systems [24]. The existence of time delays must not be ignored in many practical engineering problems [17]. Optimal control of switched systems with or without delays has become an important and challenging research topic for many applied mathematicians and engineers [2, 18, 26]. For conventionally optimal control of switched system, its aim is to determine an optimal control function and an optimal switching sequence of the switched systems involved such that a cost functional is minimized subject to constraints on the state and/or the control. The presence of delays in a switched system complicates the search for an optimal operation policy. The time-scaling transformation [8, 12, 26], 2010 Mathematics Subject Classification. Time-delay system, optimal control, nonlinear optimization, total variation. Time-delay system, optimal control, nonlinear optimization, total variation. ∗ Corresponding author: Chongyang Liu
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