Optimal Transport
Optimal transport (OT) is a mathematical framework for efficiently moving probability distributions from one configuration to another while minimizing a cost function, often visualized as the "earth mover's distance." Current research focuses on developing robust and scalable OT algorithms, particularly for high-dimensional data and applications involving noisy or unbalanced distributions, often employing neural networks and Sinkhorn iterations. These advancements are significantly impacting diverse fields, including machine learning (e.g., generative modeling, domain adaptation), image processing, and even economic modeling, by providing powerful tools for data analysis, representation learning, and fair data manipulation.
Papers
Degradation-Aware Residual-Conditioned Optimal Transport for Unified Image Restoration
Xiaole Tang, Xiang Gu, Xiaoyi He, Xin Hu, Jian Sun
Denoising Diffusions with Optimal Transport: Localization, Curvature, and Multi-Scale Complexity
Tengyuan Liang, Kulunu Dharmakeerthi, Takuya Koriyama
TPOT: Topology Preserving Optimal Transport in Retinal Fundus Image Enhancement
Xuanzhao Dong, Wenhui Zhu, Xin Li, Guoxin Sun, Yi Su, Oana M. Dumitrascu, Yalin Wang