On the existence of L^p-optimal transport maps for norms on R^N

Kirjoittajat

  • Guoxi Liu University of Oxford, Trinity College
  • Mattia Magnabosco University of Oxford, Mathematical Institute
  • Yicheng Xia University of Oxford, St Anne's College

DOI:

https://doi.org/10.54330/afm.160060

Avainsanat:

Optimal transport maps, normed spaces, Monge problem

Abstrakti

In this paper, we prove existence of \(L^p\)-optimal transport maps with \(p\in (1,\infty)\) in a class of branching metric spaces defined on \(\mathbb{R}^N\). In particular, we introduce the notion of cylinder-like convex function and we prove an existence result for the Monge problem with cost functions of the type \(c(x, y) = f(g(y - x))\), where \(f\colon [0, \infty) \to [0, \infty)\) is an increasing strictly convex function and \(g\colon \mathbb{R}^N \to [0, \infty)\) is a cylinder-like convex function. When specialised to cylinder-like norm, our results shows existence of \(L^p\)-optimal transport maps for several "branching" norms, including all norms in \(\mathbb{R}^2\) and all crystalline norms.

 

Tiedostolataukset

Julkaistu

2025-03-26

Numero

Vol 50 Nro 1 (2025)

Osasto

Articles

Lisenssi

Copyright (c) 2025 Annales Fennici Mathematici

Creative Commons License

Tämä työ on lisensoitu Creative Commons Nimeä-EiKaupallinen 4.0 Kansainvälinen Julkinen -lisenssillä.

Viittaaminen

Liu, G., Magnabosco, M., & Xia, Y. (2025). On the existence of L^p-optimal transport maps for norms on R^N. Annales Fennici Mathematici, 50(1), 187–199. https://doi.org/10.54330/afm.160060