English

Decoupling multivariate functions using a non-parametric Filtered CPD approach

Systems and Control 2021-05-19 v1 Systems and Control

Abstract

Black-box model structures are dominated by large multivariate functions. Usually a generic basis function expansion is used, e.g. a polynomial basis, and the parameters of the function are tuned given the data. This is a pragmatic and often necessary step considering the black-box nature of the problem. However, having identified a suitable function, there is no need to stick to the original basis. So-called decoupling techniques aim at translating multivariate functions into an alternative basis, thereby both reducing the number of parameters and retrieving underlying structure. In this work a filtered canonical polyadic decomposition (CPD) is introduced. It is a non-parametric method which is able to retrieve decoupled functions even when facing non-unique decompositions. Tackling this obstacle paves the way for a large number of modelling applications.

Keywords

Cite

@article{arxiv.2105.08518,
  title  = {Decoupling multivariate functions using a non-parametric Filtered CPD approach},
  author = {Jan Decuyper and Koen Tiels and Siep Weiland and Johan Schoukens},
  journal= {arXiv preprint arXiv:2105.08518},
  year   = {2021}
}

Comments

Accepted for presentation at the 19th IFAC Symposium on System Identification (SYSID 2021)

R2 v1 2026-06-24T02:13:28.438Z