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arxiv: 2505.11482 · v3 · pith:MF33VSI2new · submitted 2025-05-16 · 💻 cs.CV

Unsupervised Detection of Distribution Shift in Inverse Problems using Diffusion Models

classification 💻 cs.CV
keywords distributioninverseproblemscorrupteddiffusiondivergenceimagesmeasurements
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Diffusion models are widely used as priors in imaging inverse problems. However, their performance often degrades under distribution shifts between the training and test-time images. Existing methods for identifying and quantifying distribution shifts typically require access to clean test images, which are almost never available while solving inverse problems (at test time). We propose a fully unsupervised metric for estimating distribution shifts using only indirect (corrupted) measurements and score functions from diffusion models trained on different datasets. We theoretically show that this metric estimates the KL divergence between the training and test image distributions. Empirically, we show that our score-based metric, using only corrupted measurements, closely approximates the KL divergence computed from clean images. Motivated by this result, we show that aligning the out-of-distribution score with the in-distribution score -- using only corrupted measurements -- reduces the KL divergence and leads to improved reconstruction quality across multiple inverse problems.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. KLIP: localized distribution shift detection via KL-divergence with diffusion priors in Inverse Problems

    cs.CV 2026-05 unverdicted novelty 6.0

    KLIP detects and localizes distribution shifts in inverse problems via KL-divergence between diffusion prior and posterior without calibration data.

  2. Outlier-Robust Diffusion Solvers for Inverse Problems

    cs.CV 2026-05 unverdicted novelty 5.0

    Diffusion-based inverse problem solvers are made robust to outliers by combining explicit noise estimation with a Huber-loss IRLS objective solved via conjugate gradient.