TY - CONF
T1 - Gaussian process kernels for pattern discovery and extrapolation
AU - Wilson, Andrew Gordon
AU - Adams, Ryan Prescott
N1 - Funding Information:
This work was financially supported by Natural Science Foundation of China (No. U1803236), Hainan Provincial Natural Science Foundation of China (No. 2019RC123) and Scientific Research Foundation of Hainan University (No. KYQD (ZR) 1946). The funders had no role in study design, data collection and analysis, decision to publish, or preparation of the manuscript.
Funding Information:
The following grant information was disclosed by the authors: Natural Science Foundation of China: U1803236. Hainan Provincial Natural Science Foundation of China: 2019RC123. Scientific Research Foundation of Hainan University: KYQD (ZR) 1946.
PY - 2013
Y1 - 2013
N2 - Gaussian processes are rich distributions over functions, which provide a Bayesian nonparametric approach to smoothing and interpolation. We introduce simple closed form kernels that can be used with Gaussian processes to discover patterns and enable extrapolation. These kernels are derived by modelling a spectral density - the Fourier transform of a kernel - with a Gaussian mixture. The proposed kernels support a broad class of stationary covariances, but Gaussian process inference remains simple and analytic. We demonstrate the proposed kernels by discovering patterns and performing long range extrapolation on synthetic examples, as well as atmospheric CO2 trends and airline passenger data. We also show that it is possible to reconstruct several popular standard covariances within our framework.
AB - Gaussian processes are rich distributions over functions, which provide a Bayesian nonparametric approach to smoothing and interpolation. We introduce simple closed form kernels that can be used with Gaussian processes to discover patterns and enable extrapolation. These kernels are derived by modelling a spectral density - the Fourier transform of a kernel - with a Gaussian mixture. The proposed kernels support a broad class of stationary covariances, but Gaussian process inference remains simple and analytic. We demonstrate the proposed kernels by discovering patterns and performing long range extrapolation on synthetic examples, as well as atmospheric CO2 trends and airline passenger data. We also show that it is possible to reconstruct several popular standard covariances within our framework.
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M3 - Paper
AN - SCOPUS:84897565268
SP - 2104
EP - 2112
T2 - 30th International Conference on Machine Learning, ICML 2013
Y2 - 16 June 2013 through 21 June 2013
ER -