Partial Gaussian Graphical Model Estimation

For such Gaussian graphical models (GGMs), it is usually assumed that a given variable can bepredicted by a small numberof other variables. This assumption implies that the precision matrix is sparse. Therefore estimating Gaussian graphical model can be reduced to the problem of estimating a sparse precision matrix. One approach to sparse precision matrix estimation is covariance selection or neighborhood selection (Dempster, 1972; Meinshausen & Bühlmann, 2006), which tries to estimate each row (or column) of the precision matrix by predicting the corresponding variable using a sparse linear combination of other variables. An alternative formulation is maximum-likelihood estimation method that directly estimate the full precision matrix.