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Main Authors: Jiang, Fengqing, Li, Yuetai, Feng, Yichen, Zheng, Kaiyuan, Niu, Luyao, Ramasubramanian, Bhaskar, Alomair, Basel, Bushnell, Linda, Poovendran, Radha
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.13690
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author Jiang, Fengqing
Li, Yuetai
Feng, Yichen
Zheng, Kaiyuan
Niu, Luyao
Ramasubramanian, Bhaskar
Alomair, Basel
Bushnell, Linda
Poovendran, Radha
author_facet Jiang, Fengqing
Li, Yuetai
Feng, Yichen
Zheng, Kaiyuan
Niu, Luyao
Ramasubramanian, Bhaskar
Alomair, Basel
Bushnell, Linda
Poovendran, Radha
contents Hypergraphs provide a natural framework to model higher-order interactions in scientific, social, and biological systems. Hypergraph neural networks (HGNNs) aim to learn from such data, yet it remains unclear which higher-order structures these models can represent. We show that hypergraph expressivity is governed by which small patterns an architecture can detect and count. We formalize this via homomorphism densities, which measure how often a structural motif appears in a hypergraph. Combining classical homomorphism-count completeness with invariant approximation, we show that homomorphism densities generate all continuous hypergraph invariants and organize them into a strict hierarchy indexed by hypertree width. This yields a Width Wall: a fundamental architectural limit beyond which no hidden dimension, training procedure or fixed-depth HGNN can represent invariants requiring wider patterns. Our framework provides a unified characterization of 15 HGNN architectures, precisely identifies information lost by clique expansion, and motivates density-aware models that extend expressivity beyond bounded-width message passing. We experimentally validate this finding on an APPLICATION NODE CLASSIFICATION SUITE of real-world hypergraphs, where the Width Wall predicts when graph-reduction baselines fail and when density features help.
format Preprint
id arxiv_https___arxiv_org_abs_2605_13690
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle The WidthWall: A Strict Expressivity Hierarchy for Hypergraph Neural Networks
Jiang, Fengqing
Li, Yuetai
Feng, Yichen
Zheng, Kaiyuan
Niu, Luyao
Ramasubramanian, Bhaskar
Alomair, Basel
Bushnell, Linda
Poovendran, Radha
Machine Learning
Artificial Intelligence
Hypergraphs provide a natural framework to model higher-order interactions in scientific, social, and biological systems. Hypergraph neural networks (HGNNs) aim to learn from such data, yet it remains unclear which higher-order structures these models can represent. We show that hypergraph expressivity is governed by which small patterns an architecture can detect and count. We formalize this via homomorphism densities, which measure how often a structural motif appears in a hypergraph. Combining classical homomorphism-count completeness with invariant approximation, we show that homomorphism densities generate all continuous hypergraph invariants and organize them into a strict hierarchy indexed by hypertree width. This yields a Width Wall: a fundamental architectural limit beyond which no hidden dimension, training procedure or fixed-depth HGNN can represent invariants requiring wider patterns. Our framework provides a unified characterization of 15 HGNN architectures, precisely identifies information lost by clique expansion, and motivates density-aware models that extend expressivity beyond bounded-width message passing. We experimentally validate this finding on an APPLICATION NODE CLASSIFICATION SUITE of real-world hypergraphs, where the Width Wall predicts when graph-reduction baselines fail and when density features help.
title The WidthWall: A Strict Expressivity Hierarchy for Hypergraph Neural Networks
topic Machine Learning
Artificial Intelligence
url https://arxiv.org/abs/2605.13690