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CP2^2: Leveraging Geometry for Conformal Prediction via Canonicalization

Main:8 Pages
7 Figures
Bibliography:4 Pages
9 Tables
Appendix:5 Pages
Abstract

We study the problem of conformal prediction (CP) under geometric data shifts, where data samples are susceptible to transformations such as rotations or flips. While CP endows prediction models with post-hoc uncertainty quantification and formal coverage guarantees, their practicality breaks under distribution shifts that deteriorate model performance. To address this issue, we propose integrating geometric information--such as geometric pose--into the conformal procedure to reinstate its guarantees and ensure robustness under geometric shifts. In particular, we explore recent advancements on pose canonicalization as a suitable information extractor for this purpose. Evaluating the combined approach across discrete and continuous shifts and against equivariant and augmentation-based baselines, we find that integrating geometric information with CP yields a principled way to address geometric shifts while maintaining broad applicability to black-box predictors.

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@article{linden2025_2506.16189,
  title={ CP$^2$: Leveraging Geometry for Conformal Prediction via Canonicalization },
  author={ Putri A. van der Linden and Alexander Timans and Erik J. Bekkers },
  journal={arXiv preprint arXiv:2506.16189},
  year={ 2025 }
}
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