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Main Authors: da Silva, Marvin F., Adnan, Mohammed, Dangel, Felix, Oore, Sageev
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2604.27155
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author da Silva, Marvin F.
Adnan, Mohammed
Dangel, Felix
Oore, Sageev
author_facet da Silva, Marvin F.
Adnan, Mohammed
Dangel, Felix
Oore, Sageev
contents Model merging aims to combine multiple models into one without additional training. Naïve parameter-space averaging can be fragile under architectural symmetries, as their geometry does not take them into account. In this work we show that not only the geometry, but also the averaging procedure itself, must be symmetry-invariant to achieve symmetry-aware merges. Consequently, we propose a general solution: merging as Fréchet averaging, i.e., selecting parameters that minimize a sum of geodesic distances on an appropriate manifold. In this view, the key design choice is the overall geometry, i.e., the choice of metric, manifold, and distance approximation, that determines what it means for two models to be "close". We show that Fréchet averaging, combined with simplifying assumptions, contains Fisher merging. Building on this, we examine the particular case of low-rank adapters (LoRA), whose symmetries induce a distinct geometry: that of a quotient manifold. We outline the limitations of current LoRA merging methods, propose a practical algorithm for this setting, and show how they compare with other commonly used approaches.
format Preprint
id arxiv_https___arxiv_org_abs_2604_27155
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Generalizing the Geometry of Model Merging Through Frechet Averages
da Silva, Marvin F.
Adnan, Mohammed
Dangel, Felix
Oore, Sageev
Machine Learning
Model merging aims to combine multiple models into one without additional training. Naïve parameter-space averaging can be fragile under architectural symmetries, as their geometry does not take them into account. In this work we show that not only the geometry, but also the averaging procedure itself, must be symmetry-invariant to achieve symmetry-aware merges. Consequently, we propose a general solution: merging as Fréchet averaging, i.e., selecting parameters that minimize a sum of geodesic distances on an appropriate manifold. In this view, the key design choice is the overall geometry, i.e., the choice of metric, manifold, and distance approximation, that determines what it means for two models to be "close". We show that Fréchet averaging, combined with simplifying assumptions, contains Fisher merging. Building on this, we examine the particular case of low-rank adapters (LoRA), whose symmetries induce a distinct geometry: that of a quotient manifold. We outline the limitations of current LoRA merging methods, propose a practical algorithm for this setting, and show how they compare with other commonly used approaches.
title Generalizing the Geometry of Model Merging Through Frechet Averages
topic Machine Learning
url https://arxiv.org/abs/2604.27155