This paper explores how to approximate probability measures using structured methods, particularly within the Wasserstein-p distance. The research focuses on applications in machine learning, imaging, and sensor-constrained measurements. Key findings include a linear rate transfer for approximation schemes in L_p(Omega) to measures in W_p(Omega) for densities bounded away from zero, leveraging Bogovskii's theorem and the Benamou-Brenier formulation of optimal transport. The paper also presents deterministic bounds for discrete approximations, showing that compactly supported measures can achieve an optimal quantizer rate of O(N^{-1/d}) for their Wasserstein-p distance approximation. AI
IMPACT This research advances theoretical understanding of measure approximation, potentially improving algorithms in machine learning and data analysis.
RANK_REASON The cluster contains a single academic paper detailing theoretical research in machine learning and statistics. [lever_c_demoted from research: ic=1 ai=1.0]
- arXiv
- Benamou--Brenier
- Bogovskii
- Keaton Hamm
- Lp("Omega")
- Omega
- Voronoi partitions
- Wasserstein-p distance
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