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Main Authors: König, Gunnar, Günther, Eric, von Luxburg, Ulrike
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2410.23772
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author König, Gunnar
Günther, Eric
von Luxburg, Ulrike
author_facet König, Gunnar
Günther, Eric
von Luxburg, Ulrike
contents In explainable machine learning, global feature importance methods try to determine how much each individual feature contributes to predicting the target variable, resulting in one importance score for each feature. But often, predicting the target variable requires interactions between several features (such as in the XOR function), and features might have complex statistical dependencies that allow to partially replace one feature with another one. In commonly used feature importance scores these cooperative effects are conflated with the features' individual contributions, making them prone to misinterpretations. In this work, we derive DIP, a new mathematical decomposition of individual feature importance scores that disentangles three components: the standalone contribution and the contributions stemming from interactions and dependencies. We prove that the DIP decomposition is unique and show how it can be estimated in practice. Based on these results, we propose a new visualization of feature importance scores that clearly illustrates the different contributions.
format Preprint
id arxiv_https___arxiv_org_abs_2410_23772
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Disentangling Interactions and Dependencies in Feature Attribution
König, Gunnar
Günther, Eric
von Luxburg, Ulrike
Machine Learning
In explainable machine learning, global feature importance methods try to determine how much each individual feature contributes to predicting the target variable, resulting in one importance score for each feature. But often, predicting the target variable requires interactions between several features (such as in the XOR function), and features might have complex statistical dependencies that allow to partially replace one feature with another one. In commonly used feature importance scores these cooperative effects are conflated with the features' individual contributions, making them prone to misinterpretations. In this work, we derive DIP, a new mathematical decomposition of individual feature importance scores that disentangles three components: the standalone contribution and the contributions stemming from interactions and dependencies. We prove that the DIP decomposition is unique and show how it can be estimated in practice. Based on these results, we propose a new visualization of feature importance scores that clearly illustrates the different contributions.
title Disentangling Interactions and Dependencies in Feature Attribution
topic Machine Learning
url https://arxiv.org/abs/2410.23772