Abstract
We define a class a metric spaces we call Brownian surfaces, arising as the scaling limits of random maps on general orientable surfaces with a boundary and we study the geodesics from a uniformly chosen random point. These metric spaces generalize the well-known Brownian map and our results generalize the properties shown by Le Gall on geodesics in the latter space. We use a different approach based on two ingredients: we first study typical geodesics and then all geodesics by an "entrapment" strategy. In particular, we give geometrical characterizations of some subsets of interest, in terms of geodesics, boundary points and concatenations of geodesics forming a loop that is not homotopic to 0.
| Original language | English |
|---|---|
| Pages (from-to) | 612-646 |
| Number of pages | 35 |
| Journal | Annales de l'institut Henri Poincare (B) Probability and Statistics |
| Volume | 52 |
| Issue number | 2 |
| DOIs | |
| Publication status | Published - 1 May 2016 |
Keywords
- Bijections
- Brownian map
- Brownian surfaces
- Geodesics
- Gromov-Hausdorff topology
- Random maps
- Random metric spaces
- Scaling limits