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Hauptverfasser: Lee, Seungju, Kim, In Kyun, Park, Jong Hee, Jin, Ick Hoon
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2512.11610
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author Lee, Seungju
Kim, In Kyun
Park, Jong Hee
Jin, Ick Hoon
author_facet Lee, Seungju
Kim, In Kyun
Park, Jong Hee
Jin, Ick Hoon
contents Conventional ideal point models rely on Gaussian or quadratic utility functions that violate the triangle inequality, producing non-metric distances that complicate geometric interpretation and undermine clustering and dispersion-based analyses. We introduce a distance-based alternative that adapts the Latent Space Item Response Model (LSIRM) to roll-call data, treating legislators and bills as nodes in a bipartite network jointly embedded in a Euclidean metric space. Through controlled simulations, Euclidean LSIRM consistently recovers latent coalition structure with superior cluster separation relative to existing methods. Applied to the 118th U.S. House, the model improves vote prediction and yields bill embeddings that clarify cross-cutting issue alignments. The results show that restoring metric structure to ideal point estimation provides a clearer and more coherent inference about party cohesion, factional divisions, and multidimensional legislative behavior.
format Preprint
id arxiv_https___arxiv_org_abs_2512_11610
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Euclidean Ideal Point Estimation From Roll-Call Data via Distance-Based Bipartite Network Models
Lee, Seungju
Kim, In Kyun
Park, Jong Hee
Jin, Ick Hoon
Applications
Conventional ideal point models rely on Gaussian or quadratic utility functions that violate the triangle inequality, producing non-metric distances that complicate geometric interpretation and undermine clustering and dispersion-based analyses. We introduce a distance-based alternative that adapts the Latent Space Item Response Model (LSIRM) to roll-call data, treating legislators and bills as nodes in a bipartite network jointly embedded in a Euclidean metric space. Through controlled simulations, Euclidean LSIRM consistently recovers latent coalition structure with superior cluster separation relative to existing methods. Applied to the 118th U.S. House, the model improves vote prediction and yields bill embeddings that clarify cross-cutting issue alignments. The results show that restoring metric structure to ideal point estimation provides a clearer and more coherent inference about party cohesion, factional divisions, and multidimensional legislative behavior.
title Euclidean Ideal Point Estimation From Roll-Call Data via Distance-Based Bipartite Network Models
topic Applications
url https://arxiv.org/abs/2512.11610