A Generalised Linear Model Framework for $\beta$-Variational Autoencoders based on Exponential Dispersion Families
Abstract
Although variational autoencoders (VAE) are successfully used to obtain meaningful low-dimensional representations for high-dimensional data, the characterization of critical points of the loss function for general observation models is not fully understood. We introduce a theoretical framework that is based on a connection between -VAE and generalized linear models (GLM). The equality between the activation function of a -VAE and the inverse of the link function of a GLM enables us to provide a systematic generalization of the loss analysis for -VAE based on the assumption that the observation model distribution belongs to an exponential dispersion family (EDF). As a result, we can initialize -VAE nets by maximum likelihood estimates (MLE) that enhance the training performance on both synthetic and real world data sets. As a further consequence, we analytically describe the auto-pruning property inherent in the -VAE objective and reason for posterior collapse.
Keywords
Cite
@article{arxiv.2006.06267,
title = {A Generalised Linear Model Framework for $\beta$-Variational Autoencoders based on Exponential Dispersion Families},
author = {Robert Sicks and Ralf Korn and Stefanie Schwaar},
journal= {arXiv preprint arXiv:2006.06267},
year = {2021}
}
Comments
https://jmlr.org/papers/v22/21-0037.html