中文

The Schrödinger problem on metric graphs

偏微分方程分析 2026-07-01 v1

摘要

We study the Schr\"odinger problem on metric graphs and its different formulations. Starting from a static version, we introduce an equivalent reformulation as entropic optimal transport and show Γ\Gamma-convergence towards static optimal transport. We then rigorously derive a Benamou-Brenier type dynamic version of the Schr\"odinger problem, thereby extending known results from RCD(K,N){\rm RCD}^*(K,N)-spaces. With this equivalence at hand, we conclude that the minimum values of the dynamic Schr\"odinger problem converge towards the squared Wasserstein distance, and minimizers converge to Wasserstein geodesics. We also extend the dynamic formulation to a more general class of initial and final data and show existence of solutions in this setting using the direct method. Lastly, we illustrate our analytical findings by a numerical investigation.

引用

@article{arxiv.2607.00655,
  title  = {The Schrödinger problem on metric graphs},
  author = {Juliane Krautz and Jan-F. Pietschman},
  journal= {arXiv preprint arXiv:2607.00655},
  year   = {2026}
}