Simultaneous Blackwell Approachability and Applications to Multiclass Omniprediction

Abstract

Omniprediction is a learning problem that requires suboptimality bounds for each of a family of losses L against a family of comparator predictors C. We initiate the study of omniprediction in a multiclass setting, where the comparator family C may be infinite. Our main result is an extension of the recent binary omniprediction algorithm of [OKK25] to the multiclass setting, with sample complexity (in statistical settings) or regret horizon (in online settings) ≈ -(k+1), for -omniprediction in a k-class prediction problem. En route to proving this result, we design a framework of potential broader interest for solving Blackwell approachability problems where multiple sets must simultaneously be approached via coupled actions.