TY - JOUR
T1 - How to Systematically Distribute Candidate Models and Robust Controllers in Multiple-Model Adaptive Control
T2 - A Coverage Control Approach
AU - Kersting, Stefan
AU - Buss, Martin
N1 - Publisher Copyright:
© 2017 IEEE.
PY - 2018/4
Y1 - 2018/4
N2 - Distributing nominal models in multiple-models applications constitutes a long standing problem. The set of models needs to be distributed in such a way that their corresponding controllers can stabilize all possible system configurations in a large uncertainty set. This paper presents a systematic solution by phrasing the distribution as coverage control problem, in which each model covers a subset of the uncertainty. The subsets are derived based on a combination of the ν-gap metric, which serves as a distance measure, and the generalized stability margin. Characterizing coverage in terms of the ν-gap also motivates the use of H∞ controller synthesis to design a set of controllers. The proposed algorithms are initialized with suboptimal model configurations. Two update laws optimize the model parameters and minimize the coverage function. The first algorithm performs a gradient descent on the coverage function and the second algorithm performs pairwise optimizations. Due to computational complexity, a discretized implementation is derived, which reduces the optimization to an efficient graph search. The proposed algorithms are evaluated in numeric benchmark examples.
AB - Distributing nominal models in multiple-models applications constitutes a long standing problem. The set of models needs to be distributed in such a way that their corresponding controllers can stabilize all possible system configurations in a large uncertainty set. This paper presents a systematic solution by phrasing the distribution as coverage control problem, in which each model covers a subset of the uncertainty. The subsets are derived based on a combination of the ν-gap metric, which serves as a distance measure, and the generalized stability margin. Characterizing coverage in terms of the ν-gap also motivates the use of H∞ controller synthesis to design a set of controllers. The proposed algorithms are initialized with suboptimal model configurations. Two update laws optimize the model parameters and minimize the coverage function. The first algorithm performs a gradient descent on the coverage function and the second algorithm performs pairwise optimizations. Due to computational complexity, a discretized implementation is derived, which reduces the optimization to an efficient graph search. The proposed algorithms are evaluated in numeric benchmark examples.
KW - Coverage control
KW - multiple model adaptive control (MMAC)
KW - robust control
UR - http://www.scopus.com/inward/record.url?scp=85029149694&partnerID=8YFLogxK
U2 - 10.1109/TAC.2017.2731946
DO - 10.1109/TAC.2017.2731946
M3 - Article
AN - SCOPUS:85029149694
SN - 0018-9286
VL - 63
SP - 1075
EP - 1089
JO - IEEE Transactions on Automatic Control
JF - IEEE Transactions on Automatic Control
IS - 4
ER -