MMODELYST
Papers/Approximation Error Upper and Lower Bounds for Hölder Class with Transformers
PAP

Approximation Error Upper and Lower Bounds for Hölder Class with Transformers

May 8, 2026

arXiv
Abstract

We explore the expressive power of Transformers by establishing precise approximation error upper and lower bounds for Hölder class. Specifically, a new approximation upper bound is derived for the standard Transformer architecture equipped with Softmax operators, ReLU activation functions, and residual connections. We prove that a Transformer network composed of at most $\mathcal{O}(\varepsilon^{-{d_{0}}/α})$ blocks can approximate any bounded Hölder function with $d_{0}$-dimensional input and smoothness $α\in(0,1]$ under any accuracy $\varepsilon>0$. In the case of approximation lower bounds, leveraging the VC-dimension upper bound, we are the first to rigorously prove that Transformers demand for at least $Ω(\varepsilon^{-{d_{0}}/({4α})})$ blocks to achieve the $\varepsilon$ approximation accuracy. As a final step, we extend the derived results for standard Transformers to a general regression task and establish the corresponding excess risk rates demonstrating Transformers' empirical effectiveness in real-world settings.

Select text to highlight · click a highlight to remove · saved in this browser only
Authors
Xin He, Yuling Jiao, Xiliang Lu, Jerry Zhijian Yang
Your notes (browser-local)
saved
arXiv:2605.07463