Upper Bounds for the Largest Laplacian Eigenvalue of Simplicial Complexes

Abstract

Let K be a finite r-dimensional simplicial complex with vertex set V of size n. We study the largest eigenvalue of the combinatorial (r-1)-up Laplacian Lupr-1(K). It is known that \[ λ(Lupr-1(K)) n. \] We first give a homological equality criterion for this universal bound, namely, the equality holds if and only if the r-dimensional complement Kc of K has a nonzero reduced homology Hr-1(Kc,R). For r=1, this is the classical graph condition that the complement graph is disconnected. Secondly, we prove a sharper upper bound for λ(Lupr-1(K)): \[ λ(Lupr-1(K)) F∈ Sr(K) |E ∈ ∂ F NK(E) | n,\] where, for an (r-1)-face E, NK(E) denotes the set of vertices u outside E such that the union E \u\ is an r-face of K. This is the high-dimensional analog of the graph Laplacian bound. We give an explicit characterization of the equality case, and construct a broad family attaining the bound, namely, the partite semiregular complexes with admissible additions.