Title: Hit-and-Run Algorithms for Generating Multivariate Distributions
Abstract: We introduce a general class of Hit-and-Run algorithms for generating essentially arbitrary absolutely continuous distributions on R d . They include the Hypersphere Directions algorithm and the Coordinate Directions algorithm that have been proposed for identifying nonredundant linear constraints and for generating uniform distributions over subsets of R d . Given a bounded open set S in R d , an absolutely continuous probability distribution π on S (the target distribution) and an arbitrary probability distribution ν on the boundary of the d-dimensional unit sphere centered at the origin (the direction distribution), the (ν, π)-Hit-and-Run algorithm produces a sequence of iteration points as follows. Given the nth iteration point x, choose a direction θ according to the distribution ν and then choose the (n + 1)st iteration point according to the conditionalization of the distribution π along the line defined by x and x + θ. Under mild conditions, we show that this sequence of points is a Harris recurrent reversible Markov chain converging in total variation to the target distribution π.