English

Simplicial spanning trees in random Steiner complexes

Combinatorics 2023-01-31 v2 Probability Spectral Theory

Abstract

A spanning tree TT in a graph GG is a sub-graph of GG with the same vertex set as GG which is a tree. In 1981, McKay proved an asymptotic result regarding the number of spanning trees in random kk-regular graphs. In this paper we prove a high-dimensional generalization of McKay's result for random dd-dimensional, kk-regular simplicial complexes on nn vertices, showing that the weighted number of simplicial spanning trees is of order (ξd,k+o(1))(nd)(\xi_{d,k}+o(1))^{\binom{n}{d}} as nn\to\infty, where ξd,k\xi_{d,k} is an explicit constant, provided k>4d2+d+2k> 4d^2+d+2. A key ingredient in our proof is the local convergence of such random complexes to the dd-dimensional, kk-regular arboreal complex, which allows us to generalize McKay's result regarding the Kesten-McKay distribution.

Keywords

Cite

@article{arxiv.2008.06955,
  title  = {Simplicial spanning trees in random Steiner complexes},
  author = {Ron Rosenthal and Lior Tenenbaum},
  journal= {arXiv preprint arXiv:2008.06955},
  year   = {2023}
}

Comments

26 pages, 2 figures

R2 v1 2026-06-23T17:53:24.603Z