Bayesian Counterfactual Risk Minimization
Abstract
We present a Bayesian view of counterfactual risk minimization (CRM) for offline learning from logged bandit feedback. Using PAC-Bayesian analysis, we derive a new generalization bound for the truncated inverse propensity score estimator. We apply the bound to a class of Bayesian policies, which motivates a novel, potentially data-dependent, regularization technique for CRM. Experimental results indicate that this technique outperforms standard regularization, and that it is competitive with variance regularization while being both simpler to implement and more computationally efficient.
Keywords
Cite
@article{arxiv.1806.11500,
title = {Bayesian Counterfactual Risk Minimization},
author = {Ben London and Ted Sandler},
journal= {arXiv preprint arXiv:1806.11500},
year = {2020}
}
Comments
Extended version of the paper published at the 2019 International Conference on Machine Learning (ICML). Contains some additional citations; fewer deferred proofs; and slightly more detailed analysis. Latest revision fixes the order of authors in a reference