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Autori principali: Simchoni, Giora, Rosset, Saharon
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2412.16899
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author Simchoni, Giora
Rosset, Saharon
author_facet Simchoni, Giora
Rosset, Saharon
contents Variational Autoencoders (VAE) are widely used for dimensionality reduction of large-scale tabular and image datasets, under the assumption of independence between data observations. In practice, however, datasets are often correlated, with typical sources of correlation including spatial, temporal and clustering structures. Inspired by the literature on linear mixed models (LMM), we propose LMMVAE -- a novel model which separates the classic VAE latent model into fixed and random parts. While the fixed part assumes the latent variables are independent as usual, the random part consists of latent variables which are correlated between similar clusters in the data such as nearby locations or successive measurements. The classic VAE architecture and loss are modified accordingly. LMMVAE is shown to improve squared reconstruction error and negative likelihood loss significantly on unseen data, with simulated as well as real datasets from various applications and correlation scenarios. It also shows improvement in the performance of downstream tasks such as supervised classification on the learned representations.
format Preprint
id arxiv_https___arxiv_org_abs_2412_16899
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Integrating Random Effects in Variational Autoencoders for Dimensionality Reduction of Correlated Data
Simchoni, Giora
Rosset, Saharon
Machine Learning
Variational Autoencoders (VAE) are widely used for dimensionality reduction of large-scale tabular and image datasets, under the assumption of independence between data observations. In practice, however, datasets are often correlated, with typical sources of correlation including spatial, temporal and clustering structures. Inspired by the literature on linear mixed models (LMM), we propose LMMVAE -- a novel model which separates the classic VAE latent model into fixed and random parts. While the fixed part assumes the latent variables are independent as usual, the random part consists of latent variables which are correlated between similar clusters in the data such as nearby locations or successive measurements. The classic VAE architecture and loss are modified accordingly. LMMVAE is shown to improve squared reconstruction error and negative likelihood loss significantly on unseen data, with simulated as well as real datasets from various applications and correlation scenarios. It also shows improvement in the performance of downstream tasks such as supervised classification on the learned representations.
title Integrating Random Effects in Variational Autoencoders for Dimensionality Reduction of Correlated Data
topic Machine Learning
url https://arxiv.org/abs/2412.16899