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Vectorized Bayesian Inference for Latent Dirichlet-Tree Allocation: Theory, Computation and Applications

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Vectorized Bayesian Inference for Latent Dirichlet-Tree Allocation: Theory, Computation and Applications

Wang, Zheng ORCID: https://orcid.org/0009-0002-8118-8684 (2025) Vectorized Bayesian Inference for Latent Dirichlet-Tree Allocation: Theory, Computation and Applications. Masters thesis, Concordia University.

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Abstract

Latent Dirichlet Allocation (LDA) is a foundational model for discovering latent thematic structure in discrete data, but its Dirichlet prior cannot represent the rich correlations and hierarchical relationships often present among topics. We introduce the framework of Latent Dirichlet-Tree Allocation (LDTA), a generalization of LDA that replaces the Dirichlet prior with an arbitrary Dirichlet-Tree (DT) distribution. LDTA preserves LDA’s generative structure but enables expressive, tree-structured priors over topic proportions. To perform inference, we develop universal mean-field variational inference and Expectation Propagation, providing tractable updates for all DT. We reveal the vectorized nature of the two inference methods through theoretical development, and perform fully vectorized, GPU-accelerated implementations. The resulting framework substantially expands the modeling capacity of LDA while maintaining scalability and computational efficiency.

Divisions:Concordia University > Gina Cody School of Engineering and Computer Science > Concordia Institute for Information Systems Engineering
Item Type:Thesis (Masters)
Authors:Wang, Zheng
Institution:Concordia University
Degree Name:M.A. Sc.
Program:Information Systems Security
Date:24 November 2025
Thesis Supervisor(s):Bouguila, Nizar
ID Code:996608
Deposited By: Zheng Wang
Deposited On:29 Jun 2026 14:45
Last Modified:29 Jun 2026 14:45
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