English

On Eigenvalues of Random Complexes

Combinatorics 2015-08-26 v3 Discrete Mathematics

Abstract

We consider higher-dimensional generalizations of the normalized Laplacian and the adjacency matrix of graphs and study their eigenvalues for the Linial-Meshulam model Xk(n,p)X^k(n,p) of random kk-dimensional simplicial complexes on nn vertices. We show that for p=Ω(logn/n)p=\Omega(\log n/n), the eigenvalues of these matrices are a.a.s. concentrated around two values. The main tool, which goes back to the work of Garland, are arguments that relate the eigenvalues of these matrices to those of graphs that arise as links of (k2)(k-2)-dimensional faces. Garland's result concerns the Laplacian; we develop an analogous result for the adjacency matrix. The same arguments apply to other models of random complexes which allow for dependencies between the choices of kk-dimensional simplices. In the second part of the paper, we apply this to the question of possible higher-dimensional analogues of the discrete Cheeger inequality, which in the classical case of graphs relates the eigenvalues of a graph and its edge expansion. It is very natural to ask whether this generalizes to higher dimensions and, in particular, whether the higher-dimensional Laplacian spectra capture the notion of coboundary expansion - a generalization of edge expansion that arose in recent work of Linial and Meshulam and of Gromov. We show that this most straightforward version of a higher-dimensional discrete Cheeger inequality fails, in quite a strong way: For every k2k\geq 2 and nNn\in \mathbb{N}, there is a kk-dimensional complex YnkY^k_n on nn vertices that has strong spectral expansion properties (all nontrivial eigenvalues of the normalised kk-dimensional Laplacian lie in the interval [1O(1/n),1+O(1/n)][1-O(1/\sqrt{n}),1+O(1/\sqrt{n})]) but whose coboundary expansion is bounded from above by O(logn/n)O(\log n/n) and so tends to zero as nn\rightarrow \infty; moreover, YnkY^k_n can be taken to have vanishing integer homology in dimension less than kk.

Keywords

Cite

@article{arxiv.1411.4906,
  title  = {On Eigenvalues of Random Complexes},
  author = {Anna Gundert and Uli Wagner},
  journal= {arXiv preprint arXiv:1411.4906},
  year   = {2015}
}

Comments

Extended full version of an extended abstract that appeared at SoCG 2012, to appear in Israel Journal of Mathematics

R2 v1 2026-06-22T07:03:12.976Z