排序方式: 共有7条查询结果,搜索用时 15 毫秒
1
1.
2.
Hossein Rouzegar Alireza Khosravi Pouria Sarhadi 《Advances in Space Research (includes Cospar's Information Bulletin, Space Research Today)》2021,67(7):2172-2184
In this paper, on–off SDRE control approach is presented for spacecraft formation flying control around sun-earth L2 libration point. Orbits around libration points are significant targets for many space missions mainly because of efficient fuel consumption. Furthermore, less propellant usage can be achieved by considering optimal control approaches in spacecraft formation flying control design. Among various nonlinear and optimal control methods, SDRE has shown to be a popular controller in various missions due to the privileges including efficiency, accuracy and robustness. The spacecraft are assumed to have on–off thrusters as actuators. It requires them to be fed with a sequence of on–off pulses which is regarded as a challenge for spacecraft designers. Hence, the main contribution of this paper is designing an on–off SDRE approach for the formation flight around sun-earth L2 point with uncertainty with energy and accuracy considerations. Including on–off input as a constraint is not feasible for SDRE implementation because it makes the system non-affine. An alternative is utilizing an integral action technique and an auxiliary control to make the system affine which leads to on–off SDRE approach. It has also been shown that the proposed method is robust against parametric uncertainties of the states. Present study aims to design an energy-beneficial, simple and attractive controller for a complex nonlinear system with on–off inputs and uncertainty in CRTBP. Simulation results show that the on–off SDRE control could provide the formation flight around L2 point with high accuracy using less energy consumption. 相似文献
3.
针对燃料耗尽的失效航天器姿态接管控制问题,提出多颗微卫星协同实现姿态稳定的状态相关黎卡提方程(SDRE)微分博弈控制方法。首先,将姿态接管问题转化为多颗微卫星的微分博弈问题,基于组合航天器的姿态模型和微卫星的性能指标函数建立多颗微卫星的非线性微分博弈模型,微卫星通过独立优化各自的性能指标函数得到控制策略。其次,引入状态相关系数矩阵,将非线性博弈转化为状态相关线性二次型博弈,采用SDRE方法更方便地逼近微卫星的博弈均衡策略。最终通过李雅普诺夫迭代法求解耦合状态相关黎卡提方程组得到微卫星的状态反馈控制器,实现微卫星的自主决策。数值仿真验证了多颗微卫星采用微分博弈控制方法实现姿态接管的有效性和容错性。 相似文献
4.
针对飞行器再入段的姿态跟踪控制问题,提出了一种最优自适应积分滑模控制(Optimal Adaptive Integral Sliding Mode Control, OAISMC)方法。首先针对飞行器的标称模型设计了基于状态相依黎卡提方程(State Dependent Riccati Equation, SDRE)的姿态控制器,使标称系统的性能满足提出的最优指标。然后,考虑系统的不确定性和外部干扰,在SDRE标称控制器的基础上设计积分滑模姿态控制方法,使系统在满足性能指标要求的同时,对不确定性和干扰具有鲁棒性。进一步采用自适应方法调整切换增益,避免了对复合干扰上界的先验要求,并引入滑模干扰观测器提高系统的性能。最后,仿真结果表明,在考虑外部干扰以及气动系数和大气密度摄动的情况下,本文设计的控制方法不仅能够实现姿态跟踪、满足设计的性能指标,而且具有较好的鲁棒性。 相似文献
5.
6.
一种高超声速飞行器的非线性再入姿态控制方法 总被引:1,自引:0,他引:1
针对高超声速飞行器的再入非线性动力学模型,利用SDRE(state dependent Riccati equation)设计姿态控制器。基于奇异摄动理论,把姿态动力学分解成姿态角和姿态角速度跟踪内、外环回路,同时把非线性动力学伪线性化。每个跟踪回路用SDRE获得控制律,考虑到SDRE局部渐近稳定的特点,可以保证系统闭环稳定。最后设计高超声速飞行器飞行控制系统,并在高超声速条件下进行仿真,验证了该方案的有效性。 相似文献
7.
应用多项式拟合的SDRE方法结合改进的极坐标系(MPC)设计了三维次优导引律。介绍了 SDRE方法与多项式拟合的SDRE方法,后者是前者十分优越的逼近;推导了MPC下的弹目相对 运动方程,将球坐标下的六个状态方程减少到了三个并且满足多项式拟合SDRE方法的应用前 提;在此基础上,推导出了三维拟合SDRE导引律(nSDRE)。仿真显示,nSDRE是一种有效的导 引律,较广义理想比例导引律(GIPN)具有更好的导引品质,特别在目标机动时,nSDRE能更 好地应对目标机动引起的视线转率发散而导致脱靶的问题。
相似文献
相似文献
1