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Optimal training-conditional regret for online conformal prediction

Statistics Theory 2026-03-06 v2 Information Theory Machine Learning math.IT Machine Learning Statistics Theory

Abstract

We study online conformal prediction for non-stationary data streams subject to unknown distribution drift. While most prior work studied this problem under adversarial settings and/or assessed performance in terms of gaps of time-averaged marginal coverage, we instead evaluate performance through training-conditional cumulative regret. We specifically focus on independently generated data with two types of distribution shift: abrupt change points and smooth drift. When non-conformity score functions are pretrained on an independent dataset, we propose a split-conformal style algorithm that leverages drift detection to adaptively update calibration sets, which provably achieves minimax-optimal regret. When non-conformity scores are instead trained online, we develop a full-conformal style algorithm that again incorporates drift detection to handle non-stationarity; this approach relies on stability - rather than permutation symmetry - of the model-fitting algorithm, which is often better suited to online learning under evolving environments. We establish non-asymptotic regret guarantees for our online full conformal algorithm, which match the minimax lower bound under appropriate restrictions on the prediction sets. Numerical experiments corroborate our theoretical findings.

Keywords

Cite

@article{arxiv.2602.16537,
  title  = {Optimal training-conditional regret for online conformal prediction},
  author = {Jiadong Liang and Zhimei Ren and Yuxin Chen},
  journal= {arXiv preprint arXiv:2602.16537},
  year   = {2026}
}
R2 v1 2026-07-01T10:41:29.538Z