conftrace_
2010 AISTATS AISTATS 2010

Learning with Blocks: Composite Likelihood and Contrastive Divergence

Abstract

Composite likelihood methods provide a wide spectrum of computationally efficient techniques for statistical tasks such as parameter estimation and model selection. In this paper, we present a formal connection between the optimization of composite likelihoods and the well-known contrastive divergence algorithm. In particular, we show that composite likelihoods can be stochastically optimized by performing a variant of contrastive divergence with random-scan blocked Gibbs sampling. By using higher-order composite likelihoods, our proposed learning framework makes it possible to trade off computation time for increased accuracy. Furthermore, one can choose composite likelihood blocks that match the modelโ€™s dependence structure, making the optimization of higher-order composite likelihoods computationally efficient. We empirically analyze the performance of blocked contrastive divergence on various models, including visible Boltzmann machines, conditional random fields, and exponential random graph models, and we demonstrate that using higher-order blocks improves both the accuracy of parameter estimates and the rate of convergence.

๐Ÿš€ Conference Pioneer - AISTATS 2010
๐Ÿ“ˆ Trend Setter - Stochastic Methods
๐Ÿงญ Keyword Pioneer - composite likelihood
๐Ÿฃ Hot Topic Early Bird - stochastic optimization
๐Ÿ Cross-Pollinator - Artificial Intelligence, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Robotics, Speech & Audio
๐ŸŒฑ Topic Pioneer - Contrastive Learning
๐ŸŒ‰ Interdisciplinary Bridge - Deep Learning and Machine Learning