TY - JOUR
T1 - Regularized data-driven construction of fuzzy controllers
AU - Burger, M.
AU - Haslinger, Josef
AU - Bodenhofer, U.
AU - Engl, H. W.
N1 - Funding Information:
∗Industrial Mathematics Institute, Johannes Kepler Universität Linz, Altenbergerstr. 69, A-4040 Linz, Austria. †Software Competence Center Hagenberg, Hauptstrasse 99, A-4232 Hagenberg. E-mail: [email protected] The work of M. Burger is supported by the Austrian National Science Foundation FWF (grant SFB F013/08). J. Haslinger and U. Bodenhofer are working in the framework of the Kplus Competence Center Program which is funded by the Austrian Government, the Province of Upper Austria, and the Chamber of Commerce of Upper Austria.
PY - 2002
Y1 - 2002
N2 - This paper is devoted to the mathematical analysis and the numerical solution of data-driven construction of fuzzy controllers. We show that for a special class of controllers (so-called Sugeno controllers), the design problem is equivalent to a nonlinear least squares problem, which turns out to be ill-posed. Therefore we investigate the use of regularization in order to obtain stable approximations of the solution. We analyze a smoothing method, which is common in spline approximation, as well as Tikhonov regularization with respect to stability and convergence. In addition, we develop an iterative method for the regularized problems, which uses the special structure of the problem and test it in some typical numerical examples. We also compare the behavior of the iterations for the original and the regularized least squares problems. It turns out that the regularized problem is not only more robust but also favors solutions that are interpretable easily, which is an important criterion for fuzzy systems.
AB - This paper is devoted to the mathematical analysis and the numerical solution of data-driven construction of fuzzy controllers. We show that for a special class of controllers (so-called Sugeno controllers), the design problem is equivalent to a nonlinear least squares problem, which turns out to be ill-posed. Therefore we investigate the use of regularization in order to obtain stable approximations of the solution. We analyze a smoothing method, which is common in spline approximation, as well as Tikhonov regularization with respect to stability and convergence. In addition, we develop an iterative method for the regularized problems, which uses the special structure of the problem and test it in some typical numerical examples. We also compare the behavior of the iterations for the original and the regularized least squares problems. It turns out that the regularized problem is not only more robust but also favors solutions that are interpretable easily, which is an important criterion for fuzzy systems.
UR - http://www.scopus.com/inward/record.url?scp=0036397337&partnerID=8YFLogxK
U2 - 10.1515/jiip.2002.10.4.319
DO - 10.1515/jiip.2002.10.4.319
M3 - Article
AN - SCOPUS:0036397337
SN - 0928-0219
VL - 10
SP - 319
EP - 344
JO - Journal of Inverse and Ill-Posed Problems
JF - Journal of Inverse and Ill-Posed Problems
IS - 4
ER -