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[ PAPER ] · 2025 · Philosophical transactions. Series A, Mathematical, physical, and engineering sciences

Analysis of mean-field models arising from self-attention dynamics in transformer architectures with layer normalization

Martin Burger, Samira Kabri, Yury Korolev, Tim Roith, Lukas Weigand

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[ TLDR ]

A rigorous framework for studying the gradient flow is provided and a possible metric geometry is suggested to study the general case (i.e. one that is not described by a gradient flow) and the stationary points of the induced self-attention dynamics are analysed.

[ ABSTRACT ]

The aim of this article is to provide a mathematical analysis of transformer architectures using a self-attention mechanism with layer normalization. In particular, observed patterns in such architectures resembling either clusters or uniform distributions pose a number of challenging mathematical questions. We focus on a special case that admits a gradient flow formulation in the spaces of probability measures on the unit sphere under a special metric, which allows us to give at least partial answers in a rigorous way. The arising mathematical problems resemble those recently studied in aggregation equations but with additional challenges emerging from restricting the dynamics to the sphere and the particular form of the interaction energy. We provide a rigorous framework for studying the gradient flow, which also suggests a possible metric geometry to study the general case (i.e. one that is not described by a gradient flow). We further analyse the stationary points of the induced self-attention dynamics. The latter are related to stationary points of the interaction energy in the Wasserstein geometry, and we further discuss energy minimizers and maximizers in different parameter settings. This article is part of the theme issue ‘Partial differential equations in data science’.