Loss Functions, Axioms, and Peer Review
This addresses the problem of inconsistent peer review outcomes for researchers and conference organizers, but it is incremental as it builds on existing methods like ERM and computational social choice.
The paper tackles the inconsistency in peer review by proposing a framework to learn the community's aggregate mapping of reviewer criteria to final recommendations, using empirical risk minimization with a loss function characterized by specific hyperparameters that satisfy three axiomatic properties.
It is common to see a handful of reviewers reject a highly novel paper, because they view, say, extensive experiments as far more important than novelty, whereas the community as a whole would have embraced the paper. More generally, the disparate mapping of criteria scores to final recommendations by different reviewers is a major source of inconsistency in peer review. In this paper we present a framework inspired by empirical risk minimization (ERM) for learning the community's aggregate mapping. The key challenge that arises is the specification of a loss function for ERM. We consider the class of $L(p,q)$ loss functions, which is a matrix-extension of the standard class of $L_p$ losses on vectors; here the choice of the loss function amounts to choosing the hyperparameters $p, q \in [1,\infty]$. To deal with the absence of ground truth in our problem, we instead draw on computational social choice to identify desirable values of the hyperparameters $p$ and $q$. Specifically, we characterize $p=q=1$ as the only choice of these hyperparameters that satisfies three natural axiomatic properties. Finally, we implement and apply our approach to reviews from IJCAI 2017.