Understanding the Latent Space of Diffusion Models through the Lens of Riemannian Geometry
Keywords: diffusion models, semantic image editing, differential geometry
TL;DR: We unveil new insights into the latent space of diffusion models through a geometrical analysis. and the influence of text conditioning in image editing.
Abstract: Despite the success of diffusion models (DMs), we still lack a thorough understanding of their latent space. To understand the latent space $\mathbf{x}_t \in \mathcal{X}$, we analyze them from a geometrical perspective. Our approach involves deriving the local latent basis within $\mathcal{X}$ by leveraging the pullback metric associated with their encoding feature maps. Remarkably, our discovered local latent basis enables image editing capabilities by moving $\mathbf{x}_t$, the latent space of DMs, along the basis vector at specific timesteps. We further analyze how the geometric structure of DMs evolves over diffusion timesteps and differs across different text conditions. This confirms the known phenomenon of coarse-to-fine generation, as well as reveals novel insights such as the discrepancy between $\mathbf{x}_t$ across timesteps, the effect of dataset complexity, and the time-varying influence of text prompts. To the best of our knowledge, this paper is the first to present image editing through $\mathbf{x}$-space traversal, editing only once at specific timestep $t$ without any additional training, and providing thorough analyses of the latent structure of DMs.
The code to reproduce our experiments can be found at the [link](https://github.com/enkeejunior1/Diffusion-Pullback).
Supplementary Material: pdf
Submission Number: 308
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