Gaussian Process-based learning with new MCMC-based implementation of Wishart prior on correlation matrix

Gaussian Process (GP) models are widely used as probabilistic models for nonlinear functions because they combine flexible function modelling with uncertainty quantification (Rasmussen and Williams, 2006; Williams, 1998; MacKay, 1992; Neal, 1995). Their predictive performance depends heavily on how kernel hyperparameters are learnt (Sundararajan and Keerthi, 2001). This becomes especially important in higher-dimensional multivariate settings, where many input-specific hyperparameters may be present and where only some inputs may contribute meaningful predictive structure (MacKay, 1992; Neal, 1995; Rasmussen and Williams, 2006; Linkletter et al., 2006; Paananen et al., 2019). In standard Bayesian formulations of GP learning, prior specification is usually imposed directly on kernel hyperparameters such as lengthscales, amplitude parameters, and noise terms (Rasmussen and Williams, 2006; Williams, 1998). This is natural from a modelling point of view, but it does not always give useful control over the covariance structure that those hyperparameters induce over the observed design points (Barnard et al., 2000; Gelman, 2006; Daniels and Kass, 1999; Huang and Wand, 2013). However, it is this induced covariance matrix that directly governs likelihood evaluation, numerical stability, and predictive behaviour (Rasmussen and Williams, 2006; Stein, 1999). 1