An explicit formulation of the learned noise predictor εθ( xt, t) via the forward-process noise εt in denoising diffusion probabilistic models (DDPMs)

Abstract

In denoising diffusion probabilistic models (DDPMs), the learned noise predictor εθ ( xt , t) is trained to approximate the forward-process noise εt. The equality ∇ xt q( xt) = - 1 1- αt εθ ( xt , t) plays a fundamental role in both theoretical analyses and algorithmic design, and thus is frequently employed across diffusion-based generative models. In this paper, an explicit formulation of εθ ( xt , t) in terms of the forward-process noise εt is derived. This result show how the forward-process noise εt contributes to the learned predictor εθ ( xt , t). Furthermore, based on this formulation, we present a novel and mathematically rigorous proof of the fundamental equality above, clarifying its origin and providing new theoretical insight into the structure of diffusion models.