Fast Approximate Geodesics for Deep Generative Models
Abstract
The length of the geodesic between two data points along a Riemannian manifold, induced by a deep generative model, yields a principled measure of similarity. Current approaches are limited to low-dimensional latent spaces, due to the computational complexity of solving a non-convex optimisation problem. We propose finding shortest paths in a finite graph of samples from the aggregate approximate posterior, that can be solved exactly, at greatly reduced runtime, and without a notable loss in quality. Our approach, therefore, is hence applicable to high-dimensional problems, e.g., in the visual domain. We validate our approach empirically on a series of experiments using variational autoencoders applied to image data, including the Chair, FashionMNIST, and human movement data sets.
Cite
@article{arxiv.1812.08284,
title = {Fast Approximate Geodesics for Deep Generative Models},
author = {Nutan Chen and Francesco Ferroni and Alexej Klushyn and Alexandros Paraschos and Justin Bayer and Patrick van der Smagt},
journal= {arXiv preprint arXiv:1812.08284},
year = {2019}
}
Comments
28th International Conference on Artificial Neural Networks, 2019