Group-Algebraic Tensors: Provably-optimal Equivariant Learning and Physical Symmetry Discovery

TL;DR

This paper introduces the $ ext{ extsterling}_G$ tensor algebra, enabling intrinsic equivariance, optimal symmetry-preserving tensor approximation, and data-driven symmetry discovery, demonstrated through molecular geometry analysis and efficient predictions.

Contribution

It develops a novel algebraic framework for equivariant learning that offers provably optimal tensor approximations and interpretable symmetry decompositions, surpassing traditional neural network approaches.

Findings

Decomposes QM9 molecules to recover angular momentum rules without quantum input.

Provides closed-form predictions with significantly fewer parameters than MLPs.

Achieves optimal symmetry-preserving tensor approximations in polynomial time.

Abstract

We introduce the $\star_G$ tensor algebra, in which any finite group $G$ defines the multiplication rule, making equivariance an intrinsic algebraic property rather than an architectural constraint. The framework rests on three machine-verified theoretical pillars: (i)~an Eckart-Young optimality guarantee for the $\star_G$-SVD: the first such result for symmetry-preserving tensor approximation, exact and polynomial-time; (ii)~a Kronecker factorization that composes multiple symmetries by replacing $F_G$ with $F_{G_1} \otimes F_{G_2}$ with no architectural redesign; and (iii)~a 600-line Lean~4 formalization of the $\star_G$ algebra. The framework provides capabilities that equivariant neural networks (ENNs) structurally cannot: a closed-form per-irreducible-representation decomposition of every prediction, and data-driven discovery of the symmetry group that best fits a dataset. As a non-trivial empirical demonstration, decomposing QM9 molecular geometry over the chiral octahedral subgroup of SO(3) recovers the Wigner--Eckart selection rules of angular momentum from data alone, with no quantum mechanical input: scalar properties are A$_1$-dominated, dipole components are T$_1$-dominated, the isotropic polarizability is uniquely insensitive to $l\!=\!1$ as the rank-2-trace decomposition $l\!=\!0 \oplus l\!=\!2$ requires, and the T$_1$/A$_1$ predictive-power ratio separates vector observables from scalar observables by a factor of five. On full QM9 (130{,}831 molecules), $\star_G$-SVD with ridge regression provides closed form predictions at $\sim50-90\times$ fewer parameters than parameter-matched MLPs. Algebraic equivariance thus complements architectural equivariance not as a faster-better-cheaper alternative but as a different mathematical affordance: provably-optimal symmetry-preserving compression, per-irrep interpretability, and data-driven physical discovery.