Learning From Ordered Sets and Applications in Collaborative Ranking
Abstract
Ranking over sets arise when users choose between groups of items. For example, a group may be of those movies deemed stars to them, or a customized tour package. It turns out, to model this data type properly, we need to investigate the general combinatorics problem of partitioning a set and ordering the subsets. Here we construct a probabilistic log-linear model over a set of ordered subsets. Inference in this combinatorial space is highly challenging: The space size approaches as approaches infinity. We propose a \texttt{split-and-merge} Metropolis-Hastings procedure that can explore the state-space efficiently. For discovering hidden aspects in the data, we enrich the model with latent binary variables so that the posteriors can be efficiently evaluated. Finally, we evaluate the proposed model on large-scale collaborative filtering tasks and demonstrate that it is competitive against state-of-the-art methods.
Cite
@article{arxiv.1408.0043,
title = {Learning From Ordered Sets and Applications in Collaborative Ranking},
author = {Truyen Tran and Dinh Phung and Svetha Venkatesh},
journal= {arXiv preprint arXiv:1408.0043},
year = {2014}
}
Comments
JMLR: Workshop and Conference Proceedings 25:1-16, 2012, Asian Conference on Machine Learning