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Gaussian Processes

Gaussian Processes is a powerful framework for several machine learning tasks such as regression, classification and inference. Given a finite set of input output training data that is generated out of a fixed (but possibly unknown) function, the framework models the unknown function as a stochastic process such that the training outputs are a finite number of jointly Gaussian random variables, whose properties can then be used to infer the statistics (the mean and variance) of the function at test values of input.

Source: Sequential Randomized Matrix Factorization for Gaussian Processes: Efficient Predictions and Hyper-parameter Optimization

Papers

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Showing 551560 of 1963 papers

TitleStatusHype
Federated Causal Inference from Observational DataCode0
Dynamic Bayesian Learning for Spatiotemporal Mechanistic ModelsCode0
Dynamic Online Ensembles of Basis ExpansionsCode0
Functional Variational Bayesian Neural NetworksCode0
Distributionally Robust Optimization for Deep Kernel Multiple Instance LearningCode0
Bayesian optimization of atomic structures with prior probabilities from universal interatomic potentialsCode0
Fast Kernel Approximations for Latent Force Models and Convolved Multiple-Output Gaussian processesCode0
How Good are Low-Rank Approximations in Gaussian Process Regression?Code0
lgpr: An interpretable nonparametric method for inferring covariate effects from longitudinal dataCode0
Fast Evaluation of Additive Kernels: Feature Arrangement, Fourier Methods, and Kernel DerivativesCode0
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Benchmark Results

#ModelMetricClaimedVerifiedStatus
1ICKy, periodicRoot mean square error (RMSE)0.03Unverified