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Main Authors: Hougen, Conrad D., Pazdernik, Karl T., Hero, Alfred O.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.21741
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author Hougen, Conrad D.
Pazdernik, Karl T.
Hero, Alfred O.
author_facet Hougen, Conrad D.
Pazdernik, Karl T.
Hero, Alfred O.
contents Interpretable topic modeling is essential for tracking how research interests evolve within co-author communities. In scientific corpora, where novelty is prized, identifying underrepresented niche topics is particularly important. However, contemporary models built from dense transformer embeddings tend to miss rare topics and therefore also fail to capture smooth temporal alignment. We propose a geometric method that integrates multimodal text and co-author network data, using Hellinger distances and Ward's linkage to construct a hierarchical topic dendrogram. This approach captures both local and global structure, supporting multiscale learning across semantic and temporal dimensions. Our method effectively identifies rare-topic structure and visualizes smooth topic drift over time. Experiments highlight the strength of interpretable bag-of-words models when paired with principled geometric alignment.
format Preprint
id arxiv_https___arxiv_org_abs_2511_21741
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Multiscale Geometric Method for Capturing Relational Topic Alignment
Hougen, Conrad D.
Pazdernik, Karl T.
Hero, Alfred O.
Computation and Language
Machine Learning
Interpretable topic modeling is essential for tracking how research interests evolve within co-author communities. In scientific corpora, where novelty is prized, identifying underrepresented niche topics is particularly important. However, contemporary models built from dense transformer embeddings tend to miss rare topics and therefore also fail to capture smooth temporal alignment. We propose a geometric method that integrates multimodal text and co-author network data, using Hellinger distances and Ward's linkage to construct a hierarchical topic dendrogram. This approach captures both local and global structure, supporting multiscale learning across semantic and temporal dimensions. Our method effectively identifies rare-topic structure and visualizes smooth topic drift over time. Experiments highlight the strength of interpretable bag-of-words models when paired with principled geometric alignment.
title A Multiscale Geometric Method for Capturing Relational Topic Alignment
topic Computation and Language
Machine Learning
url https://arxiv.org/abs/2511.21741