English

Optimal quantization with branched optimal transport distances

Optimization and Control 2025-04-01 v3 Analysis of PDEs Functional Analysis

Abstract

We consider the problem of optimal approximation of a target measure by an atomic measure with NN atoms, in branched optimal transport distance. This is a new branched transport version of optimal quantization problems. New difficulties arise, since in classical semi-discrete optimal transport with Wasserstein distance, the interfaces between cells associated with neighboring atoms have Voronoi structure and satisfy an explicit description. This description is missing for our problem, in which the cell interfaces are thought to have fractal boundary. We study the asymptotic behaviour of optimal quantizers for absolutely continuous measures as the number NN of atoms grows to infinity. We compute the limit distribution of the corresponding point clouds and show in particular a branched transport version of Zador's theorem. Moreover, we establish uniformity bounds of optimal quantizers in terms of separation distance and covering radius of the atoms, when the measure is dd-Ahlfors regular. A crucial technical tool is the uniform in NN H\"older regularity of the landscape function, a branched transport analog to Kantorovich potentials in classical optimal transport.

Keywords

Cite

@article{arxiv.2309.08677,
  title  = {Optimal quantization with branched optimal transport distances},
  author = {Paul Pegon and Mircea Petrache},
  journal= {arXiv preprint arXiv:2309.08677},
  year   = {2025}
}

Comments

Accepted in SIAM Journal on Mathematical Analysis (2025). 42 pages + bibliography

R2 v1 2026-06-28T12:23:01.509Z