Infinite stable looptrees
Abstract
We give a construction of an infinite stable looptree, which we denote by , and prove that it arises both as a local limit of the compact stable looptrees of Curien and Kortchemski (2015), and as a scaling limit of the infinite discrete looptrees of Richier (2017) and Bj\"ornberg and Stef\'ansson (2015). As a consequence, we are able to prove various convergence results for volumes of small balls in compact stable looptrees, explored more deeply in a companion paper. We also establish the spectral dimension of , and show that it agrees with that of its discrete counterpart. Moreover, we show that Brownian motion on arises as a scaling limit of random walks on discrete looptrees, and as a local limit of Brownian motion on compact stable looptrees, which has similar consequences for the limit of the heat kernel.
Keywords
Cite
@article{arxiv.1902.01717,
title = {Infinite stable looptrees},
author = {Eleanor Archer},
journal= {arXiv preprint arXiv:1902.01717},
year = {2020}
}
Comments
45 pages (some further proof details added to earlier version). arXiv admin note: text overlap with arXiv:1902.01713