PhD ThesisMultivariate regression analysis has been developed rapidly in the last decade for dependent data. The most di cult part in multivariate cases is how to construct a crosscorrelation between response variables. We need to make sure that the covariance matrix is positive de nite which is not an easy task. Several approaches have been developed to overcome the issue. However, most of them have some limitations, such as it is hard to extend it to the case involving high dimensional variables or capture individual characteristics. It also should point out that the meaning of the cross-correlation structure for some methods is unclear. To address the issues, we propose to use convolved Gaussian process (CGP) priors (Boyle & Frea...
Cross-sectional and longitudinal imaging studies are moving increasingly to the forefront of medical...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
Gaussian factor models have proven widely useful for parsimoniously characterizing dependence in mul...
In this thesis we address the problem of modeling correlated outputs using Gaussian process priors. ...
In this article, we propose a generalized Gaussian process concurrent regression model for functiona...
This dissertation aims at introducing Gaussian process priors on the regression to capture features ...
This paper presents an approach to Bayesian semiparametric inference for Gaussian multivariate respo...
The Bayesian treed multivariate Gaussian process (BTMGP) and Bayesian treed Gaussian process (BTGP) ...
Recently there has been an increasing interest in the multivariate Gaussian process (MGP) which exte...
Gaussian processes that can be decomposed into a smooth mean function and a stationary autocorrelate...
Gaussian process regression (GPR) has been shown to be a powerful and effective nonparametric method...
This research proposes a unified Gaussian process modeling approach that extends to data from the ex...
This paper identifies and develops the class of Gaussian copula models for marginal regression analy...
We propose a family of multivariate Gaussian process models for correlated out-puts, based on assumi...
Analyzing multivariate time series data is important to predict future events and changes of complex...
Cross-sectional and longitudinal imaging studies are moving increasingly to the forefront of medical...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
Gaussian factor models have proven widely useful for parsimoniously characterizing dependence in mul...
In this thesis we address the problem of modeling correlated outputs using Gaussian process priors. ...
In this article, we propose a generalized Gaussian process concurrent regression model for functiona...
This dissertation aims at introducing Gaussian process priors on the regression to capture features ...
This paper presents an approach to Bayesian semiparametric inference for Gaussian multivariate respo...
The Bayesian treed multivariate Gaussian process (BTMGP) and Bayesian treed Gaussian process (BTGP) ...
Recently there has been an increasing interest in the multivariate Gaussian process (MGP) which exte...
Gaussian processes that can be decomposed into a smooth mean function and a stationary autocorrelate...
Gaussian process regression (GPR) has been shown to be a powerful and effective nonparametric method...
This research proposes a unified Gaussian process modeling approach that extends to data from the ex...
This paper identifies and develops the class of Gaussian copula models for marginal regression analy...
We propose a family of multivariate Gaussian process models for correlated out-puts, based on assumi...
Analyzing multivariate time series data is important to predict future events and changes of complex...
Cross-sectional and longitudinal imaging studies are moving increasingly to the forefront of medical...
Gaussian Process Regression is a non parametric approach for estimating relationships in data sets. ...
Gaussian factor models have proven widely useful for parsimoniously characterizing dependence in mul...