A latent force model is a Gaussian process with a covariance function inspired by a differential operator. Such covariance function is obtained by performing convolution integrals between Green's functions associated to the differential operators, and covariance functions associated to latent functions. In the classical formulation of latent force models, the covariance functions are obtained analytically by solving a double integral, leading to expressions that involve numerical solutions of different types of error functions. In consequence, the covariance matrix calculation is considerably expensive, because it requires the evaluation of one or more of these error functions. In this paper, we use random Fourier features to approximate th...
This work brings together two powerful concepts in Gaussian processes: the variational approach to s...
We introduce the convolutional spectral kernel (CSK), a novel family of non-stationary, nonparametri...
This article is concerned with learning and stochastic control in physical systems which contain unk...
Gaussian processes are usually parameterised in terms of their covari-ance functions. However, this ...
Recently there has been an increasing interest in methods that deal with multiple outputs. This has ...
© 1963-2012 IEEE. This paper is concerned with learning and stochastic control in physical systems t...
International audienceIn Gaussian Processes a multi-output kernel is a covariance function over corr...
We present a practical way of introducing convolutional structure into Gaussian processes, making th...
Gaussian processes are usually parameterised in terms of their covariance functions. However, this m...
Recently there has been an increasing interest in methods that deal with multiple out-puts. This has...
Purely data-driven approaches for machine learning present difficulties when data are scarce relativ...
We present a novel extension of multi-output Gaussian processes for handling heterogeneous outputs. ...
In this thesis we address the problem of modeling correlated outputs using Gaussian process priors. ...
Interest in multioutput kernel methods is increasing, whether under the guise of multitask learning,...
We introduced the Gaussian Process Convolution Model (GPCM) in [1], a time-series model for stationa...
This work brings together two powerful concepts in Gaussian processes: the variational approach to s...
We introduce the convolutional spectral kernel (CSK), a novel family of non-stationary, nonparametri...
This article is concerned with learning and stochastic control in physical systems which contain unk...
Gaussian processes are usually parameterised in terms of their covari-ance functions. However, this ...
Recently there has been an increasing interest in methods that deal with multiple outputs. This has ...
© 1963-2012 IEEE. This paper is concerned with learning and stochastic control in physical systems t...
International audienceIn Gaussian Processes a multi-output kernel is a covariance function over corr...
We present a practical way of introducing convolutional structure into Gaussian processes, making th...
Gaussian processes are usually parameterised in terms of their covariance functions. However, this m...
Recently there has been an increasing interest in methods that deal with multiple out-puts. This has...
Purely data-driven approaches for machine learning present difficulties when data are scarce relativ...
We present a novel extension of multi-output Gaussian processes for handling heterogeneous outputs. ...
In this thesis we address the problem of modeling correlated outputs using Gaussian process priors. ...
Interest in multioutput kernel methods is increasing, whether under the guise of multitask learning,...
We introduced the Gaussian Process Convolution Model (GPCM) in [1], a time-series model for stationa...
This work brings together two powerful concepts in Gaussian processes: the variational approach to s...
We introduce the convolutional spectral kernel (CSK), a novel family of non-stationary, nonparametri...
This article is concerned with learning and stochastic control in physical systems which contain unk...