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Main Authors: Valero-Leal, Enrique, Bischl, Bernd, Larrañaga, Pedro, Bielza, Concha, Casalicchio, Giuseppe
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2601.20692
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author Valero-Leal, Enrique
Bischl, Bernd
Larrañaga, Pedro
Bielza, Concha
Casalicchio, Giuseppe
author_facet Valero-Leal, Enrique
Bischl, Bernd
Larrañaga, Pedro
Bielza, Concha
Casalicchio, Giuseppe
contents Group counterfactual explanations find a set of counterfactual instances to explain a group of input instances contrastively. However, existing methods either (i) optimize counterfactuals only for a fixed group and do not generalize to new group members, (ii) strictly rely on strong model assumptions (e.g., linearity) for tractability or/and (iii) poorly control the counterfactual group geometry distortion. We instead learn an explicit optimal transport map that sends any group instance to its counterfactual without re-optimization, minimizing the group's total transport cost. This enables generalization with fewer parameters, making it easier to interpret the common actionable recourse. For linear classifiers, we prove that functions representing group counterfactuals are derived via mathematical optimization, identifying the underlying convex optimization type (QP, QCQP, ...). Experiments show that they accurately generalize, preserve group geometry and incur only negligible additional transport cost compared to baseline methods. If model linearity cannot be exploited, our approach also significantly outperforms the baselines.
format Preprint
id arxiv_https___arxiv_org_abs_2601_20692
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Optimal Transport Group Counterfactual Explanations
Valero-Leal, Enrique
Bischl, Bernd
Larrañaga, Pedro
Bielza, Concha
Casalicchio, Giuseppe
Machine Learning
Group counterfactual explanations find a set of counterfactual instances to explain a group of input instances contrastively. However, existing methods either (i) optimize counterfactuals only for a fixed group and do not generalize to new group members, (ii) strictly rely on strong model assumptions (e.g., linearity) for tractability or/and (iii) poorly control the counterfactual group geometry distortion. We instead learn an explicit optimal transport map that sends any group instance to its counterfactual without re-optimization, minimizing the group's total transport cost. This enables generalization with fewer parameters, making it easier to interpret the common actionable recourse. For linear classifiers, we prove that functions representing group counterfactuals are derived via mathematical optimization, identifying the underlying convex optimization type (QP, QCQP, ...). Experiments show that they accurately generalize, preserve group geometry and incur only negligible additional transport cost compared to baseline methods. If model linearity cannot be exploited, our approach also significantly outperforms the baselines.
title Optimal Transport Group Counterfactual Explanations
topic Machine Learning
url https://arxiv.org/abs/2601.20692