An eigenvalue interlacing approach to Garland's method

Abstract

Let X be a pure d-dimensional simplicial complex. For 0 k d, let X(k) be the set of k-dimensional faces of X, let Lk(X) be the k-dimensional weighted total Laplacian operator on X, and let Hk(X;R) be its k-dimensional reduced homology group with real coefficients. For σ∈ X, let lk(X,σ) be the link of σ in X. For a matrix M, we denote by Spec(M) the multi-set containing all the eigenvalues of M. We show that, for every 0 <k d, \[ dim(Hk(X;R)) Ση∈ X()| \ λ∈ Spec(Lk--1(lk(X,η))) :\, λ (+1)(d-k)k+1\|. \] This extends the classical vanishing theorem of Garland, corresponding to the special case when the right hand side of the inequality is equal to zero, and a more recent result by Hino and Kanazawa, corresponding to the case =k-1. A main new ingredient in our proof is an abstract version of Garland's local to global principle, which follows as a simple consequence of the eigenvalue interlacing theorem, and may be of independent interest.