Sculpting Art from Chaos: Diffusion Models — SMLDs
Last Updated on December 11, 2023 by Editorial Team
Author(s): Son Cain
Originally published on Towards AI.
Imagination creates reality…
Generated image from Stable Diffusion
In the previous article, we covered the general structure of diffusion models as well as a very popular category, Denoising Diffusion Probabilistic Models (DDPMs). Now, we will take a look at a completely different but equivalent approach to formulating the diffusion process. The models in this class are called SMLDs, Score Matching via Langevin Dynamics, a name that will become clearer later on.
Let’s begin our journey!
At the core of these models lies the (Stein) score function of a probability density p(x) which is given by ∇ₓlogp(x).
This quantity provides the directions according to which we move from a random sample x₀ towards a sample xₙ in a region with high density. The algorithm that is used for this process is called Langevin sampling algorithm.
Just like DDPMs took inspiration from thermodynamics, the fundamental idea behind SMLDs can be traced back to physics. In particular, Langevin sampling, known in physics as Langevin Dynamics, is an approach to the mathematical modeling of the dynamics of molecular systems originally developed by French physicist Paul Langevin.
But enough talk. Let’s now take a look at the actual math behind this beautiful idea!
The theoretical foundation for this category of diffusion models wasestablished in the… Read the full blog for free on Medium.
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Published via Towards AI