English

Controlled Accuracy Gibbs Sampling of Order Constrained Non-IID Ordered Random Variates

Computation 2021-11-15 v2

Abstract

Order statistics arising from mm independent but not identically distributed random variables are typically constructed by arranging some X1,X2,,XmX_{1}, X_{2}, \ldots, X_{m}, with XiX_{i} having distribution function Fi(x)F_{i}(x), in increasing order denoted as X(1)X(2)X(m)X_{(1)} \leq X_{(2)} \leq \ldots \leq X_{(m)}. In this case, X(i)X_{(i)} is not necessarily associated with Fi(x)F_{i}(x). Assuming one can simulate values from each distribution, one can generate such "non-iid" order statistics by simulating XiX_{i} from FiF_{i}, for i=1,2,,mi=1,2,\ldots, m, and arranging them in order. In this paper, we consider the problem of simulating ordered values X(1),X(2),,X(m)X_{(1)}, X_{(2)}, \ldots, X_{(m)} such that the marginal distribution of X(i)X_{(i)} is Fi(x)F_{i}(x). This problem arises in Bayesian principal components analysis (BPCA) where the XiX_{i} are ordered eigenvalues that are a posteriori independent but not identically distributed. We propose a novel coupling-from-the-past algorithm to "perfectly" (up to computable order of accuracy) simulate such {\emph{order-constrained non-iid}} order statistics. We demonstrate the effectiveness of our approach for several examples, including the BPCA problem.

Keywords

Cite

@article{arxiv.2012.15452,
  title  = {Controlled Accuracy Gibbs Sampling of Order Constrained Non-IID Ordered Random Variates},
  author = {Jem N. Corcoran and Caleb Miller},
  journal= {arXiv preprint arXiv:2012.15452},
  year   = {2021}
}

Comments

18 pages, 20 figures

R2 v1 2026-06-23T21:37:41.630Z