English

Random groups, random graphs and eigenvalues of p-Laplacians

Group Theory 2019-08-21 v3 Combinatorics Probability

Abstract

We prove that a random group in the triangular density model has, for density larger than 1/3, fixed point properties for actions on LpL^p-spaces (affine isometric, and more generally (22ϵ)1/2p(2-2\epsilon)^{1/2p}-uniformly Lipschitz) with pp varying in an interval increasing with the set of generators. In the same model, we establish a double inequality between the maximal pp for which LpL^p-fixed point properties hold and the conformal dimension of the boundary. In the Gromov density model, we prove that for every p0[2,)p_0 \in [2, \infty) for a sufficiently large number of generators and for any density larger than 1/3, a random group satisfies the fixed point property for affine actions on LpL^p-spaces that are (22ϵ)1/2p(2-2\epsilon)^{1/2p}-uniformly Lipschitz, and this for every p[2,p0]p\in [2,p_0]. To accomplish these goals we find new bounds on the first eigenvalue of the p-Laplacian on random graphs, using methods adapted from Kahn and Szemeredi's approach to the 2-Laplacian. These in turn lead to fixed point properties using arguments of Bourdon and Gromov, which extend to LpL^p-spaces previous results for Kazhdan's Property (T) established by Zuk and Ballmann-Swiatkowski.

Keywords

Cite

@article{arxiv.1607.04130,
  title  = {Random groups, random graphs and eigenvalues of p-Laplacians},
  author = {Cornelia Drutu and John M. Mackay},
  journal= {arXiv preprint arXiv:1607.04130},
  year   = {2019}
}

Comments

v1: 51 pages; v2: 54 pages, minor updates and corrections to 2<p<3 case; v3: 56 pages, minor updates

R2 v1 2026-06-22T14:54:41.152Z