Sparse On-line Gaussian Processes
Overview
Authors
Affiliations
We develop an approach for sparse representations of gaussian process (GP) models (which are Bayesian types of kernel machines) in order to overcome their limitations for large data sets. The method is based on a combination of a Bayesian on-line algorithm, together with a sequential construction of a relevant subsample of the data that fully specifies the prediction of the GP model. By using an appealing parameterization and projection techniques in a reproducing kernel Hilbert space, recursions for the effective parameters and a sparse gaussian approximation of the posterior process are obtained. This allows for both a propagation of predictions and Bayesian error measures. The significance and robustness of our approach are demonstrated on a variety of experiments.
A Survey on Knowledge Transfer for Manufacturing Data Analytics.
Bang S, Ak R, Narayanan A, Lee Y, Cho H Comput Ind. 2024; 104.
PMID: 39440000 PMC: 11495017. DOI: 10.1016/j.compind.2018.07.001.
Correlated product of experts for sparse Gaussian process regression.
Schurch M, Azzimonti D, Benavoli A, Zaffalon M Mach Learn. 2023; 112(5):1411-1432.
PMID: 37162796 PMC: 10163145. DOI: 10.1007/s10994-022-06297-3.
Bayesian nonparametric inference for heterogeneously mixing infectious disease models.
Seymour R, Kypraios T, ONeill P Proc Natl Acad Sci U S A. 2022; 119(10):e2118425119.
PMID: 35238628 PMC: 8915959. DOI: 10.1073/pnas.2118425119.
Liu G, Onnela J J Am Med Inform Assoc. 2021; 28(8):1777-1784.
PMID: 34100950 PMC: 8324229. DOI: 10.1093/jamia/ocab069.
On Data-Driven Sparse Sensing and Linear Estimation of Fluid Flows.
Jayaraman B, Al Mamun S Sensors (Basel). 2020; 20(13).
PMID: 32635527 PMC: 7374391. DOI: 10.3390/s20133752.