แนวคิดหลัก
A novel data-driven stochastic model predictive control framework is proposed for uncertain linear systems with noisy output measurements. The approach leverages multi-step predictors to efficiently propagate uncertainty and ensure chance constraint satisfaction with minimal conservatism.
บทคัดย่อ
The paper presents a data-driven stochastic model predictive control (MPC) framework for uncertain linear systems with noisy output measurements. The key aspects of the proposed approach are:
-
Multi-step Predictors:
- The system is reformulated using multi-step predictors, which directly relate the current output to the past inputs and initial state.
- This avoids the limitations of sequential propagation in traditional state-space models.
-
Parameter Identification:
- A method is proposed to identify the multi-step predictors and quantify the associated uncertainty using maximum likelihood estimation (MLE) based on the innovation form of the system obtained through Kalman filter recursions.
- This allows effective utilization of data from a single input-output trajectory, without requiring precise knowledge of the system parameters.
-
Chance Constraint Satisfaction:
- The uncertainty in the estimated multi-step predictor parameters is explicitly accounted for in the predictive control problem formulation.
- A constraint tightening approach is developed to ensure chance constraint satisfaction with minimal conservatism, by directly using the distribution of the parameter estimates.
The numerical example demonstrates that the proposed data-driven approach can significantly reduce conservatism compared to state-of-the-art solutions while reliably satisfying the probabilistic constraints, despite the lack of precise model knowledge.
สถิติ
The system has 3 masses, 3 position measurements, and 1 control input.
The disturbance covariance is diag(0, 0, 0, 1e-3, 1e-3, 1e-3).
The measurement noise covariance is 1e-3 * I.
คำพูด
"The primary contribution of this paper is the development of a data-driven predictive control framework that employs multi-step predictors to ensure chance-constraint satisfaction for linear stochastic systems using only input-output data."
"Ensuring satisfaction of safety-critical constraints when the data is subject to noise remains as a significant challenge. The proposed framework addresses this problem by identifying multi-step predictors to directly enforce probabilistic constraints."