Learning Maximum-A-Posteriori Perturbation Models for Structured Prediction in Polynomial Time
Machine Learning
2019-05-28 v1 Machine Learning
Abstract
MAP perturbation models have emerged as a powerful framework for inference in structured prediction. Such models provide a way to efficiently sample from the Gibbs distribution and facilitate predictions that are robust to random noise. In this paper, we propose a provably polynomial time randomized algorithm for learning the parameters of perturbed MAP predictors. Our approach is based on minimizing a novel Rademacher-based generalization bound on the expected loss of a perturbed MAP predictor, which can be computed in polynomial time. We obtain conditions under which our randomized learning algorithm can guarantee generalization to unseen examples.
Cite
@article{arxiv.1805.08196,
title = {Learning Maximum-A-Posteriori Perturbation Models for Structured Prediction in Polynomial Time},
author = {Asish Ghoshal and Jean Honorio},
journal= {arXiv preprint arXiv:1805.08196},
year = {2019}
}
Comments
Accepted to ICML 2018