Consider a regression problem where the dependent variable to be predicted is not a single real-valued scalar but an m-length vector of correlated real numbers. As in the standard regression setup, there are n observations, where each observation i consists of k-1 explanatory variables, grouped into a vector of length k. This can be viewed as a set of m related regression problems for each observation i: where the set of errors are all correlated. Equivalently, it can be viewed as a single regression problem where the outcome is a row vector and the regression coefficient vectors are stacked next to each other, as follows: The coefficient matrixB is a matrix where the coefficient vectors for each regression problem are stacked horizontally: The noise vector for each observation i is jointly normal, so that the outcomes for a given observation are correlated: We can write the entire regression problem in matrix form as: where Y and E are matrices. The design matrixX is an matrix with the observations stacked vertically, as in the standard linear regression setup: The classical, frequentists linear least squares solution is to simply estimate the matrix of regression coefficients using the Moore-Penrose pseudoinverse: To obtain the Bayesian solution, we need to specify the conditional likelihood and then find the appropriate conjugate prior. As with the univariate case of linear Bayesian regression, we will find that we can specify a natural conditional conjugate prior. Let us write our conditional likelihood as writing the error in terms of and yields We seek a natural conjugate prior—a joint density which is of the same functional form as the likelihood. Since the likelihood is quadratic in, we re-write the likelihood so it is normal in . Using the same technique as with Bayesian linear regression, we decompose the exponential term using a matrix-form of the sum-of-squares technique. Here, however, we will also need to use the MatrixDifferential Calculus. First, let us apply sum-of-squares to obtain new expression for the likelihood: We would like to develop a conditional form for the priors: where is an inverse-Wishart distribution and is some form of normal distribution in the matrix. This is accomplished using the vectorization transformation, which converts the likelihood from a function of the matrices to a function of the vectors. Write Let where denotes the Kronecker product of matrices A and B, a generalization of the outer product which multiplies an matrix by a matrix to generate an matrix, consisting of every combination of products of elements from the two matrices. Then which will lead to a likelihood which is normal in. With the likelihood in a more tractable form, we can now find a natural conjugate prior.
The natural conjugate prior using the vectorized variable is of the form: where and
Posterior distribution
Using the above prior and likelihood, the posterior distribution can be expressed as: where. The terms involving can be grouped using: with This now allows us to write the posterior in a more useful form: This takes the form of an inverse-Wishart distribution times a Matrix normal distribution: and The parameters of this posterior are given by:
