Hermite kernel surrogates for the value function of high-dimensional nonlinear optimal control problems

IF 1.7 3区 数学 Q2 MATHEMATICS, APPLIED
Tobias Ehring, Bernard Haasdonk
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引用次数: 0

Abstract

Numerical methods for the optimal feedback control of high-dimensional dynamical systems typically suffer from the curse of dimensionality. In the current presentation, we devise a mesh-free data-based approximation method for the value function of optimal control problems, which partially mitigates the dimensionality problem. The method is based on a greedy Hermite kernel interpolation scheme and incorporates context knowledge by its structure. Especially, the value function surrogate is elegantly enforced to be 0 in the target state, non-negative and constructed as a correction of a linearized model. The algorithm allows formulation in a matrix-free way which ensures efficient offline and online evaluation of the surrogate, circumventing the large-matrix problem for multivariate Hermite interpolation. Additionally, an incremental Cholesky factorization is utilized in the offline generation of the surrogate. For finite time horizons, both convergence of the surrogate to the value function and for the surrogate vs. the optimal controlled dynamical system are proven. Experiments support the effectiveness of the scheme, using among others a new academic model with an explicitly given value function. It may also be useful for the community to validate other optimal control approaches.

高维非线性优化控制问题价值函数的赫米特核替代物
高维动态系统最优反馈控制的数值方法通常会受到维数诅咒的影响。在本报告中,我们为最优控制问题的值函数设计了一种基于网格的无数据近似方法,从而部分缓解了维数问题。该方法基于贪婪的 Hermite 核插值方案,并通过其结构纳入了上下文知识。特别是,在目标状态下,价值函数代用值被优雅地强制为 0、非负值,并作为线性化模型的修正来构建。该算法允许以无矩阵的方式进行表述,从而确保高效地离线和在线评估代用值,规避了多元赫米特插值法的大矩阵问题。此外,在离线生成代理时还采用了增量 Cholesky 因式分解法。在有限时间范围内,代用值函数的收敛性以及代用值函数与最优受控动态系统的收敛性都得到了证明。实验证明了该方案的有效性,实验中使用了一个明确给出价值函数的新学术模型。该方案还可用于验证其他最优控制方法。
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来源期刊
CiteScore
3.00
自引率
5.90%
发文量
68
审稿时长
3 months
期刊介绍: Advances in Computational Mathematics publishes high quality, accessible and original articles at the forefront of computational and applied mathematics, with a clear potential for impact across the sciences. The journal emphasizes three core areas: approximation theory and computational geometry; numerical analysis, modelling and simulation; imaging, signal processing and data analysis. This journal welcomes papers that are accessible to a broad audience in the mathematical sciences and that show either an advance in computational methodology or a novel scientific application area, or both. Methods papers should rely on rigorous analysis and/or convincing numerical studies.
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