An Improved Coordinate Update Method for the Identification of Adaptive Hinging Hyperplanes Model
Authors: 
Qinghua Tao, Jun Xu, Shuning Wang, Li LiAuthors Info & Claims
Pages 102 - 106
Abstract
Adaptive hinging hyperplanes (AHH) is a popular continuous piecewise linear (CPWL) model. It has been proved that any continuous nonlinear function can be approximated by a CPWL function with arbitrary precision. The existing identification of AHH simply traverses all the dimensions on the pre-given splitting points to select the best, which fails to consider all the parameters synchronously and the randomness in the splitting, thus the identified model may not be optimal. In this paper, we propose an improved method to identify AHH model with coordinate update strategy. We first use the existing identification method of AHH to initially obtain a basic model structure, and afterwards alternatively optimize the parameters to improve accuracy. Specifically, to explore the interactive and global effects among all the nonlinear parameters, adaptive block coordinate DIRECT (ABCD) algorithm is employed to simultaneously optimize the nonlinear parameters, while the linear parameters can be calculated by least squares (LS) method. Besides, the proposed method is promising to conduct extensions to identify different CWPL models or other nonlinear models even with various error criteria. Numerical experiments show that the proposed method improves the accuracy and stability in identifying AHH and it can even achieve higher accuracy with simpler model structure.
References
[1]
M. Bjorkman, K. Holmstrom, Global Optimization Using the DIRECT Algorithm in Matlab, Matlab Advanced Modeling & Optimization. 1(2) (1999) 1--8.
[2]
Breiman. L, Hinging hyperplanes for regression, classification, and function approximation, IEEE Transactions on Information Theory.39(3) (2002) 999--1013.
[3]
L. O. Chua, K. M. Kang, Section-wise piecewise-linear functions: Canonical representation, properties, and applications, in: Proceedings of the IEEE. 65(6) (1977) 915--929.
[4]
P. Craven, G. Wahba, Smoothing noisy data with spline functions, Springer. 1978.
[5]
J. H Friedman, Multivariate Adaptive Regression Splines, Annals of Statistics. 19(1) (1991) 1--67.
[6]
X. Huang, J. Xu, S. Wang, Nonlinear system identification with continuous piecewise linear neural network, Neurocomputing. 77(1) (2012) 167--177.
[7]
X. Huang, J. Xu, S. Wang, Identification algorithm for standard continuous piecewise linear neural network, in: Proceedings of the IEEE American Control Conference. 2010, 4931--4936.
[8]
X. Huang, X. Mu, S. Wang, Continuous Piecewise Linear Identification with Moderate Number of Subregions, in: Proceedings of IFAC Symposium on System Identification. 45(16) (2012) 535--540.
[9]
X. Huang, J. Xu, S. Wang, Parameters estimation of hinging hyperplanes using median squared error criterion, International Journal of Control Automation & Systems. 9(4) (2011) 627--635.
[10]
D. R. Jones, C. D. Perttunen, B. Stuckman, Lipschitzian optimization without the Lipschitz constant, Plenum Press. 1993.
[11]
P. Julian, A. Desages, O. Agamennoni, High-level canonical piecewise linear representation using a simplicial partition, IEEE Transactions on Circuits & Systems I Fundamental Theory & Applications. 46(4) (1999) 463--480.
[12]
S. Kang, L. O. Chua, A global representation of multidimensional piecewise-linear functions with linear partitions, IEEE Transactions on Circuits & Systems, 25(11) (1978) 938--940.
[13]
Q. Tao, X. Huang, S. Wang, et al., Adaptive block coordinate DIRECT algorithm, Journal of Global Optimization. (2016) 1--26
[14]
S. Wang, X. Sun, Generalization of hinging hyperplanes, IEEE Transactions on Information Theory. 51(12) (2005) 4425--4431.
[15]
C. Wen, S. Wang, X. Jin, et al., Identification of dynamic systems using Piecewise-Affine basis function models, Automatica, 43(10) (2007) 1824--1831.
[16]
J. Xu, X. Huang, S. Wang, Adaptive Hinging Hyperplanes, in: Proceedings of World Congress of the International Federation of Automatic Control. 41(2) (2008) 4036--4041.
[17]
J. Xu, X. Huang, S. Wang, Adaptive hinging hyperplanes and its applications in dynamic system identification, Automatica. 45(10) (2009) 2325--2332.
[18]
J. Xu, X. Huang, X. Mu, et al., Model predictive control based on adaptive hinging hyperplanes model, Journal of Process Control. 22(10) (2012) 1821--1831.
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Published In
February 2018
260 pages
ISBN:9781450364102
DOI:10.1145/3192975
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Published: 24 February 2018
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ICCAE 2018
ICCAE 2018: 2018 10th International Conference on Computer and Automation Engineering
February 24 - 26, 2018
Brisbane, Australia
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