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Main Authors: Kumar, Aakash, Bucarelli, Maria Sofia, Natale, Emanuele
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.28304
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author Kumar, Aakash
Bucarelli, Maria Sofia
Natale, Emanuele
author_facet Kumar, Aakash
Bucarelli, Maria Sofia
Natale, Emanuele
contents Composing autoregressive models remains a core challenge in understanding how large language models can combine behaviors or skills learned across tasks. We introduce a new and principled composition strategy for autoregressive systems, inspired by composition methods developed for diffusion models. Under a factorized-conditionals assumption, we show that the resulting composition is projective: each component model preserves control over its own designated subspace of the output distribution avoiding interference between models. This property is further preserved under smooth reparameterizations of the output space, yielding a feature-space theorem. Finally, we show that composition preserves length-generalizing behavior when the factorization assumptions and component guarantees hold uniformly at the target length. These results provide a principled understanding of when model composition and merging succeed in autoregressive systems and identify conditions under which their interactions remain stable.
format Preprint
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institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Compositional Generalization in Autoregressive Models via Logit Composition
Kumar, Aakash
Bucarelli, Maria Sofia
Natale, Emanuele
Machine Learning
Composing autoregressive models remains a core challenge in understanding how large language models can combine behaviors or skills learned across tasks. We introduce a new and principled composition strategy for autoregressive systems, inspired by composition methods developed for diffusion models. Under a factorized-conditionals assumption, we show that the resulting composition is projective: each component model preserves control over its own designated subspace of the output distribution avoiding interference between models. This property is further preserved under smooth reparameterizations of the output space, yielding a feature-space theorem. Finally, we show that composition preserves length-generalizing behavior when the factorization assumptions and component guarantees hold uniformly at the target length. These results provide a principled understanding of when model composition and merging succeed in autoregressive systems and identify conditions under which their interactions remain stable.
title Compositional Generalization in Autoregressive Models via Logit Composition
topic Machine Learning
url https://arxiv.org/abs/2605.28304