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arxiv: 2204.11371 · v2 · pith:ZOZ3755Bnew · submitted 2022-04-24 · 💻 cs.LG

Learning Symmetric Embeddings for Equivariant World Models

classification 💻 cs.LG
keywords equivariantmodelsdatasymmetrictransformationsinputlearningnetwork
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Incorporating symmetries can lead to highly data-efficient and generalizable models by defining equivalence classes of data samples related by transformations. However, characterizing how transformations act on input data is often difficult, limiting the applicability of equivariant models. We propose learning symmetric embedding networks (SENs) that encode an input space (e.g. images), where we do not know the effect of transformations (e.g. rotations), to a feature space that transforms in a known manner under these operations. This network can be trained end-to-end with an equivariant task network to learn an explicitly symmetric representation. We validate this approach in the context of equivariant transition models with 3 distinct forms of symmetry. Our experiments demonstrate that SENs facilitate the application of equivariant networks to data with complex symmetry representations. Moreover, doing so can yield improvements in accuracy and generalization relative to both fully-equivariant and non-equivariant baselines.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Blind Recovery of Latent Domains via Unsupervised Symmetry Discovery

    cs.LG 2026-06 unverdicted novelty 6.0

    Unsupervised symmetry discovery via shallow group-convolutional networks recovers latent domains from linear measurements of random fields by learning symmetry actions under stationarity and locality constraints.

  2. Adaptive Canonicalization with Application to Invariant Anisotropic Geometric Networks

    cs.LG 2025-09 unverdicted novelty 6.0

    Adaptive canonicalization selects input canonical forms by maximizing network predictive confidence to yield continuous symmetry-preserving models with universal approximation for equivariant geometric networks.