Open AccessModeling interactive components by coordinate kernel polynomial models
Author(s) -
Xin Guo,
Lexin Li,
Qiang Wu
Publication year - 2020
Publication title -
mathematical foundations of computing
Language(s) - English
Resource type - Journals
ISSN - 2577-8838
DOI - 10.3934/mfc.2020010
Subject(s) - kernel (algebra) , polynomial kernel , computer science , generalization , kernel principal component analysis , polynomial regression , polynomial , perspective (graphical) , kernel method , component (thermodynamics) , kernel regression , artificial intelligence , mathematics , algorithm , machine learning , regression analysis , regression , support vector machine , statistics , discrete mathematics , physics , thermodynamics , mathematical analysis
We proposed the use of coordinate kernel polynomials in kernel regression. This new approach, called coordinate kernel polynomial regression, can simultaneously identify active variables and effective interactive components. Reparametrization refinement is found critical to improve the modeling accuracy and prediction power. The post-training component selection allows one to identify effective interactive components. Generalization error bounds are used to explain the effectiveness of the algorithm from a learning theory perspective and simulation studies are used to show its empirical effectiveness.
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