Distributional Uncertainty Propagation via Optimal Transport
成果类型:
Article
署名作者:
Aolaritei, Liviu; Lanzetti, Nicolas; Chen, Hongruyu; Dorfler, Florian
署名单位:
Swiss Federal Institutes of Technology Domain; ETH Zurich
刊物名称:
IEEE TRANSACTIONS ON AUTOMATIC CONTROL
ISSN/ISSBN:
0018-9286
DOI:
10.1109/TAC.2025.3567559
发表日期:
2025
页码:
6080-6095
关键词:
uncertainty
probability distribution
Stochastic processes
convolution
computational modeling
estimation
dynamical systems
Random variables
optimization
COSTS
distributional uncertainty
distributionally robust control (DRC)
optimal transport (OT)
uncertainty propagation
摘要:
This article addresses the limitations of standard uncertainty models, i.e., robust (norm-bounded) and stochastic (one fixed distribution, e.g., Gaussian), and proposes to model uncertainty via optimal transport (OT) ambiguity sets. These constitute a very rich uncertainty model, which enjoys many desirable geometrical, statistical, and computational properties, and which naturally generalizes both robust and stochastic models, and captures many additional real-world uncertainty phenomena (e.g., black swan events). Our contributions show that OT ambiguity sets are also analytically tractable: they propagate easily and intuitively through linear and nonlinear (possibly corrupted by noise) transformations, and the result of the propagation is again an OT ambiguity set or can be upper bounded by an OT ambiguity set. In the context of dynamical systems, our results allow us to consider multiple sources of uncertainty (e.g., initial condition, additive noise, and multiplicative noise) and to capture in closed form, via an OT ambiguity set, the resulting uncertainty in the state at any future time. Our results are actionable, interpretable, and readily employable in a great variety of computationally tractable control and estimation formulations. To highlight this, we study three applications in trajectory planning, consensus algorithms, and least squares estimation.
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