Gaussian process (GP) regression is a fundamental tool in Bayesian statistics. It is also known as kriging and is the Bayesian counterpart to the frequentist kernel ridge regression. Most of the theoretical work on GP regression has focused on a large-$n$ asymptotics, characterising the behaviour of GP regression as the amount of data increases. Fixed-sample analysis is much more difficult outside of simple cases, such as locations on a regular grid. In this work we perform a fixed-sample analysis that was first studied in the context of approximation theory by Driscoll & Fornberg (2002), called the "flat limit". In flat-limit asymptotics, the goal is to characterise kernel methods as the length-scale of the kernel function tends to infinit...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
While there is strong motivation for using Gaussian Processes (GPs) due to their excellent performan...
International audienceThis paper deals with the learning curve in a Gaussian process regression fram...
Gaussian process (GP) regression is a fundamental tool in Bayesian statistics. It is also known as k...
Abstract—Exact Gaussian process (GP) regression has OðN3Þ runtime for data size N, making it intract...
Gaussian processes are a powerful and flexible class of nonparametric models that use covariance fun...
We provide guarantees for approximate Gaussian Process (GP) regression resulting from two common low...
Exact Gaussian process (GP) regression is not available for n 10, 000 (O(n3) for learning and O(n) ...
We present a new sparse Gaussian Process (GP) model for regression. The key novel idea is to sparsif...
In this paper, we examine two widely-used approaches, the polynomial chaos expansion (PCE) and Gauss...
Gaussian processes are distributions over functions that are versatile and mathematically convenient...
We generalise the Gaussian process (GP) framework for regression by learning a nonlinear transformat...
Excellent variational approximations to Gaussian process posteriors have been developed which avoid ...
In this report, we discuss the application and usage of Gaussian Process in Classification and Regre...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
While there is strong motivation for using Gaussian Processes (GPs) due to their excellent performan...
International audienceThis paper deals with the learning curve in a Gaussian process regression fram...
Gaussian process (GP) regression is a fundamental tool in Bayesian statistics. It is also known as k...
Abstract—Exact Gaussian process (GP) regression has OðN3Þ runtime for data size N, making it intract...
Gaussian processes are a powerful and flexible class of nonparametric models that use covariance fun...
We provide guarantees for approximate Gaussian Process (GP) regression resulting from two common low...
Exact Gaussian process (GP) regression is not available for n 10, 000 (O(n3) for learning and O(n) ...
We present a new sparse Gaussian Process (GP) model for regression. The key novel idea is to sparsif...
In this paper, we examine two widely-used approaches, the polynomial chaos expansion (PCE) and Gauss...
Gaussian processes are distributions over functions that are versatile and mathematically convenient...
We generalise the Gaussian process (GP) framework for regression by learning a nonlinear transformat...
Excellent variational approximations to Gaussian process posteriors have been developed which avoid ...
In this report, we discuss the application and usage of Gaussian Process in Classification and Regre...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
Most existing sparse Gaussian process (g.p.) models seek computational advantages by basing their co...
While there is strong motivation for using Gaussian Processes (GPs) due to their excellent performan...
International audienceThis paper deals with the learning curve in a Gaussian process regression fram...