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Main Authors: Li, Liuzhuozheng, Zhan, Zhiyuan, Liu, Shuhong, Jiang, Dengyang, Wang, Zanyi, Dai, Guang, Wang, Jingdong, Wang, Mengmeng
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.25289
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author Li, Liuzhuozheng
Zhan, Zhiyuan
Liu, Shuhong
Jiang, Dengyang
Wang, Zanyi
Dai, Guang
Wang, Jingdong
Wang, Mengmeng
author_facet Li, Liuzhuozheng
Zhan, Zhiyuan
Liu, Shuhong
Jiang, Dengyang
Wang, Zanyi
Dai, Guang
Wang, Jingdong
Wang, Mengmeng
contents Practically, training diffusion models typically requires explicit time conditioning to guide the network through the denoising sampling process. Especially in deterministic methods like DDIM, the absence of time conditioning leads to significant performance degradation. However, other deterministic sampling approaches, such as flow matching, can generate high-quality content without this conditioning, raising the question of its necessity. In this work, we revisit the role of time conditioning from a geometric perspective. We analyze the evolution of noisy data distributions under the forward diffusion process and demonstrate that, in high-dimensional spaces, these distributions concentrate on low-dimensional hyper-cylinder-like manifolds embedded within the input space. Successful generation, we argue, stems from the disentanglement of these manifolds in high-dimensional space. Based on this insight, we modify the forward process of DDIM to align the noisy data manifold with the flow-matching approach, proving that DDIM can generate high-quality content without time conditioning, provided the noisy manifold evolves according to the flow-matching method. Additionally, we extend our framework to class-conditioned generation by decoupling classes into distinct time spaces, enabling class-conditioned synthesis with a class-unconditional denoising model. Extensive experiments validate our theoretical analysis and show that high-quality generation is achievable without explicit conditional embeddings.
format Preprint
id arxiv_https___arxiv_org_abs_2604_25289
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Exploring Time Conditioning in Diffusion Generative Models from Disjoint Noisy Data Manifolds
Li, Liuzhuozheng
Zhan, Zhiyuan
Liu, Shuhong
Jiang, Dengyang
Wang, Zanyi
Dai, Guang
Wang, Jingdong
Wang, Mengmeng
Machine Learning
Computer Vision and Pattern Recognition
Practically, training diffusion models typically requires explicit time conditioning to guide the network through the denoising sampling process. Especially in deterministic methods like DDIM, the absence of time conditioning leads to significant performance degradation. However, other deterministic sampling approaches, such as flow matching, can generate high-quality content without this conditioning, raising the question of its necessity. In this work, we revisit the role of time conditioning from a geometric perspective. We analyze the evolution of noisy data distributions under the forward diffusion process and demonstrate that, in high-dimensional spaces, these distributions concentrate on low-dimensional hyper-cylinder-like manifolds embedded within the input space. Successful generation, we argue, stems from the disentanglement of these manifolds in high-dimensional space. Based on this insight, we modify the forward process of DDIM to align the noisy data manifold with the flow-matching approach, proving that DDIM can generate high-quality content without time conditioning, provided the noisy manifold evolves according to the flow-matching method. Additionally, we extend our framework to class-conditioned generation by decoupling classes into distinct time spaces, enabling class-conditioned synthesis with a class-unconditional denoising model. Extensive experiments validate our theoretical analysis and show that high-quality generation is achievable without explicit conditional embeddings.
title Exploring Time Conditioning in Diffusion Generative Models from Disjoint Noisy Data Manifolds
topic Machine Learning
Computer Vision and Pattern Recognition
url https://arxiv.org/abs/2604.25289