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Compact Matrix Quantum Group Equivariant Neural Networks

Machine Learning 2025-05-26 v2 Combinatorics Category Theory Representation Theory Machine Learning

Abstract

Group equivariant neural networks have proven effective in modelling a wide range of tasks where the data lives in a classical geometric space and exhibits well-defined group symmetries. However, these networks are not suitable for learning from data that lives in a non-commutative geometry, described formally by non-commutative CC^{*}-algebras, since the CC^{*}-algebra of continuous functions on a compact matrix group is commutative. To address this limitation, we derive the existence of a new type of equivariant neural network, called compact matrix quantum group equivariant neural networks, which encode symmetries that are described by compact matrix quantum groups. We characterise the weight matrices that appear in these neural networks for the easy compact matrix quantum groups, which are defined by set partitions. As a result, we obtain new characterisations of equivariant weight matrices for some compact matrix groups that have not appeared previously in the machine learning literature.

Keywords

Cite

@article{arxiv.2311.06358,
  title  = {Compact Matrix Quantum Group Equivariant Neural Networks},
  author = {Edward Pearce-Crump},
  journal= {arXiv preprint arXiv:2311.06358},
  year   = {2025}
}

Comments

ICML 2025 Poster; 32 pages

R2 v1 2026-06-28T13:17:45.888Z