3 research outputs found
Flexible sampling of discrete data correlations without the marginal distributions
Learning the joint dependence of discrete variables is a fundamental problem
in machine learning, with many applications including prediction, clustering
and dimensionality reduction. More recently, the framework of copula modeling
has gained popularity due to its modular parametrization of joint
distributions. Among other properties, copulas provide a recipe for combining
flexible models for univariate marginal distributions with parametric families
suitable for potentially high dimensional dependence structures. More
radically, the extended rank likelihood approach of Hoff (2007) bypasses
learning marginal models completely when such information is ancillary to the
learning task at hand as in, e.g., standard dimensionality reduction problems
or copula parameter estimation. The main idea is to represent data by their
observable rank statistics, ignoring any other information from the marginals.
Inference is typically done in a Bayesian framework with Gaussian copulas, and
it is complicated by the fact this implies sampling within a space where the
number of constraints increases quadratically with the number of data points.
The result is slow mixing when using off-the-shelf Gibbs sampling. We present
an efficient algorithm based on recent advances on constrained Hamiltonian
Markov chain Monte Carlo that is simple to implement and does not require
paying for a quadratic cost in sample size.Comment: An overhauled version of the experimental section moved to the main
paper. Old experimental section moved to supplementary materia