Gaussian Process Regression

Gaussian Process Regression (GPR) is a Bayesian non-parametric method used for regression tasks, aiming to predict a continuous output variable based on input data while providing uncertainty estimates. Current research emphasizes improving GPR's scalability and robustness, focusing on techniques like dividing local Gaussian processes for continual learning, tensor network methods for high-dimensional data, and efficient kernel selection and subsampling strategies. These advancements enhance GPR's applicability across diverse fields, including system identification, time series forecasting, safety-critical control systems, and scientific modeling where accurate uncertainty quantification is crucial.

Papers

December 23, 2024

Learning from Summarized Data: Gaussian Process Regression with Sample Quasi-Likelihood
Yuta Shikuri
LeArning Abstract Gaussian Process Regression External Sample Aggregated Data Spatial Modelling

December 17, 2024

GPgym: A Remote Service Platform with Gaussian Process Regression for Online Learning
Xiaobing Dai, Zewen Yang
Machine Learning Practical Algorithm Online Learning Gaussian Process Regression

December 16, 2024

Asynchronous Distributed Gaussian Process Regression for Online Learning and Dynamical Systems: Complementary Document
Zewen Yang, Xiaobing Dai, Sandra Hirche
Dynamical System Online Learning Gaussian Process Regression Document Relevance PAPER Demand \Cite{meir2021market

December 9, 2024

Obstacle-aware Gaussian Process Regression
Gaurav Shrivastava
Gaussian Process RSD Difference of Gaussian Gaussian Process Regression Regression Task

November 28, 2024

Electricity Price Prediction Using Multi-Kernel Gaussian Process Regression combined with Kernel-Based Support Vector Regression
Abhinav Das, Stephan Schlüter, Lorenz Schneider
Novel Regression Gaussian Process Regression Support Vector Regression Electricity Price Forecasting

November 19, 2024

Hybrid Gaussian Process Regression with Temporal Feature Extraction for Partially Interpretable Remaining Useful Life Interval Prediction in Aeroengine Prognostics
Tian Niu, Zijun Xu, Heng Luo, Ziqing Zhou
Gaussian Process Regression Useful Life Uncertainty Modeling AI Based Remaining Useful Life Prediction Spatio Temporal Feature Extraction

October 31, 2024

Cost-Aware Query Policies in Active Learning for Efficient Autonomous Robotic Exploration
Sapphira Akins, Hans Mertens, Frances Zhu
Active Learning Autonomous Exploration Gaussian Process Regression Informative Path Planning Action Cost Real World Constraint

October 28, 2024

High-Dimensional Gaussian Process Regression with Soft Kernel Interpolation
Chris Camaño, Daniel Huang
Gaussian Process Softmax Function Gaussian Process Regression Interpolation Regime Small Kernel Kernel Interpolation

October 27, 2024

Evaluation of uncertainty estimations for Gaussian process regression based machine learning interatomic potentials
Matthias Holzenkamp, Dongyu Lyu, Ulrich Kleinekathöfer, Peter Zaspel
Global Evaluation New Machine Uncertainty Estimation Gaussian Process Regression Interatomic Potential Uncertain Sample Ensemble Uncertainty

October 24, 2024

A Causal Graph-Enhanced Gaussian Process Regression for Modeling Engine-out NOx
Shrenik Zinage, Ilias Bilionis, Peter Meckl
Gaussian Process Real Time Causal Graph Gaussian Process Regression Causal Event

October 21, 2024

Learning signals defined on graphs with optimal transport and Gaussian process regression
Raphaël Carpintero Perez (CMAP), Sébastien da Veiga (ENSAI, CREST), Josselin Garnier (CMAP), Brian Staber
Graph Drawing Gaussian Process Optimal Transport RSD Difference of Gaussian Gaussian Process Regression Abnormal Signal Numerical Experiment Functional Regression Computational Physic

October 8, 2024

Learning to Race in Extreme Turning Scene with Active Exploration and Gaussian Process Regression-based MPC
Guoqiang Wu, Cheng Hu, Wangjia Weng, Zhouheng Li, Yonghao Fu, Lei Xie, Hongye Su
Gaussian Process Gaussian Process Regression Active Exploration Vehicle Control Driving Maneuver Drift Estimator

October 1, 2024

GPTreeO: An R package for continual regression with dividing local Gaussian processes
Timo Braun, Anders Kvellestad, Riccardo De Bin
Gaussian Process Gaussian Process Regression R Package

September 5, 2024

Tensor network square root Kalman filter for online Gaussian process regression
Clara Menzen, Manon Kok, Kim Batselier
Gaussian Process Gaussian Process Regression Tensor Network

August 21, 2024

QuaCK-TSF: Quantum-Classical Kernelized Time Series Forecasting
Abdallah Aaraba, Soumaya Cherkaoui, Ola Ahmad, Jean-Frédéric Laprade, Olivier Nahman-Lévesque, Alexis Vieloszynski, Shengrui Wang
Gaussian Process Regression Probabilistic Forecast Quantum Kernel Probabilistic Time Series Forecasting Quantum Model Quantum Feature Map

August 16, 2024

Error Bounds For Gaussian Process Regression Under Bounded Support Noise With Applications To Safety Certification
Robert Reed, Luca Laurenti, Morteza Lahijanian
Financial Application Gaussian Process Regression Reproducing Kernel Hilbert Space Error Bound Barrier Function Support Estimation Safety Certificate

August 3, 2024

Batch Active Learning in Gaussian Process Regression using Derivatives
Hon Sum Alec Yu, Christoph Zimmer, Duy Nguyen-Tuong
Gaussian Process Gaussian Process Regression Total Correlation Derivative Process Batch Active Learning

July 28, 2024

What can we learn about Reionization astrophysical parameters using Gaussian Process Regression?
Purba Mukherjee, Antara Dey, Supratik Pal
Gaussian Process Regression Astronomical Data UV Mapping

June 30, 2024

Hyperparameter Optimization for Randomized Algorithms: A Case Study on Random Features
Oliver R. A. Dunbar, Nicholas H. Nelsen, Maya Mutic
Case Study Hyperparameter Optimization Hyperparameter Tuning Gaussian Process Regression Hyper Parameter Random Feature Randomized Algorithm Random Feature Regression

June 18, 2024

Contraction rates for conjugate gradient and Lanczos approximate posteriors in Gaussian process regression
Bernhard Stankewitz, Botond Szabo
Gaussian Process Gaussian Process Regression Posterior Approximation Kernel Matrix Conjugate Gradient Contraction Theory Matrix Diagonalization Kaczmarz Algorithm

Gaussian Process Regression

Papers

Learning from Summarized Data: Gaussian Process Regression with Sample Quasi-Likelihood

GPgym: A Remote Service Platform with Gaussian Process Regression for Online Learning

Asynchronous Distributed Gaussian Process Regression for Online Learning and Dynamical Systems: Complementary Document

Obstacle-aware Gaussian Process Regression

Electricity Price Prediction Using Multi-Kernel Gaussian Process Regression combined with Kernel-Based Support Vector Regression

Hybrid Gaussian Process Regression with Temporal Feature Extraction for Partially Interpretable Remaining Useful Life Interval Prediction in Aeroengine Prognostics

Cost-Aware Query Policies in Active Learning for Efficient Autonomous Robotic Exploration

High-Dimensional Gaussian Process Regression with Soft Kernel Interpolation

Evaluation of uncertainty estimations for Gaussian process regression based machine learning interatomic potentials

A Causal Graph-Enhanced Gaussian Process Regression for Modeling Engine-out NOx

Learning signals defined on graphs with optimal transport and Gaussian process regression

Learning to Race in Extreme Turning Scene with Active Exploration and Gaussian Process Regression-based MPC

GPTreeO: An R package for continual regression with dividing local Gaussian processes

Tensor network square root Kalman filter for online Gaussian process regression

QuaCK-TSF: Quantum-Classical Kernelized Time Series Forecasting

Error Bounds For Gaussian Process Regression Under Bounded Support Noise With Applications To Safety Certification

Batch Active Learning in Gaussian Process Regression using Derivatives

What can we learn about Reionization astrophysical parameters using Gaussian Process Regression?

Hyperparameter Optimization for Randomized Algorithms: A Case Study on Random Features

Contraction rates for conjugate gradient and Lanczos approximate posteriors in Gaussian process regression