Equivariant Finite Normalizing Flows

TL;DR

This paper introduces discrete equivariant normalizing flows for generative modeling, providing theoretical guarantees and demonstrating improved performance on image datasets like CIFAR-10.

Contribution

It develops new equivariant flow models, proves their theoretical existence and universality, and applies them to image data for enhanced efficiency and accuracy.

Findings

Improved likelihood estimates on CIFAR-10.

Faster convergence and increased data efficiency.

Theoretical proof of existence and universality of equivariant flows.

Abstract

Generative modeling seeks to uncover the underlying factors that give rise to observed data that can often be modeled as the natural symmetries that manifest themselves through invariances and equivariances to certain transformation laws. However, current approaches to representing these symmetries are couched in the formalism of continuous normalizing flows that require the construction of equivariant vector fields -- inhibiting their simple application to conventional higher dimensional generative modelling domains like natural images. In this paper, we focus on building equivariant normalizing flows using discrete layers. We first theoretically prove the existence of an equivariant map for compact groups whose actions are on compact spaces. We further introduce three new equivariant flows: $G$-Residual Flows, $G$-Coupling Flows, and $G$-Inverse Autoregressive Flows that elevate classical Residual, Coupling, and Inverse Autoregressive Flows with equivariant maps to a prescribed group $G$. Our construction of $G$-Residual Flows are also universal, in the sense that we prove an $G$-equivariant diffeomorphism can be exactly mapped by a $G$-residual flow. Finally, we complement our theoretical insights with demonstrative experiments -- for the first time -- on image datasets like CIFAR-10 and show $G$-Equivariant Finite Normalizing flows lead to increased data efficiency, faster convergence, and improved likelihood estimates.