Gaussian process regression (GPR) is a non-parametric Bayesian technique for interpolating or fitting data. The main barrier to further uptake of this powerful tool rests in the computational costs associated with the matrices which arise when dealing with large datasets. Here, we derive some simple results which we have found useful for speeding up the learning stage in the GPR algorithm, and especially for performing Bayesian model comparison between different covariance functions. We apply our techniques to both synthetic and real data and quantify the speed-up relative to using nested sampling to numerically evaluate model evidences
Gaussian processes have emerged as a powerful tool for modeling complex and noisy functions. They ha...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
grantor: University of TorontoThis thesis develops two Bayesian learning methods relying o...
The use of Gaussian processes (GPs) is supported by efficient sampling algorithms, a rich methodolog...
Gaussian process (GP) models are widely used to perform Bayesian nonlinear regression and classifica...
Gaussian process (GP) predictors are an important component of many Bayesian approaches to machine l...
The computation required for Gaussian process regression with n training examples is about O(n^3) du...
Gaussian processes (GPs) are widely used in the Bayesian approach to supervised learning. Their abil...
Gaussian processes (GPs) are natural generalisations of multivariate Gaussian random variables to in...
Gaussian Process (GP) has become a common Bayesian inference framework and has been applied in many ...
A wealth of computationally efficient approximation methods for Gaussian process regression have bee...
Non-parametric models and techniques enjoy a growing popularity in the field of machine learning, an...
Institute for Adaptive and Neural ComputationNon-parametric models and techniques enjoy a growing po...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
Gaussian processes have emerged as a powerful tool for modeling complex and noisy functions. They ha...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
The analysis of time series data is important in fields as disparate as the social sciences, biology...
grantor: University of TorontoThis thesis develops two Bayesian learning methods relying o...
The use of Gaussian processes (GPs) is supported by efficient sampling algorithms, a rich methodolog...
Gaussian process (GP) models are widely used to perform Bayesian nonlinear regression and classifica...
Gaussian process (GP) predictors are an important component of many Bayesian approaches to machine l...
The computation required for Gaussian process regression with n training examples is about O(n^3) du...
Gaussian processes (GPs) are widely used in the Bayesian approach to supervised learning. Their abil...
Gaussian processes (GPs) are natural generalisations of multivariate Gaussian random variables to in...
Gaussian Process (GP) has become a common Bayesian inference framework and has been applied in many ...
A wealth of computationally efficient approximation methods for Gaussian process regression have bee...
Non-parametric models and techniques enjoy a growing popularity in the field of machine learning, an...
Institute for Adaptive and Neural ComputationNon-parametric models and techniques enjoy a growing po...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
Gaussian processes have emerged as a powerful tool for modeling complex and noisy functions. They ha...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
The analysis of time series data is important in fields as disparate as the social sciences, biology...