The complex property of the boundary operator on simplicial complexes

Abstract

We study the complex property ∂∂ = 0 of the boundary operator ∂ on a weighted, infinite, and possibly non-locally finite simplicial complex. We give a characterization of this property in 2 in terms of the recurrence of the links of simplices. The complex property is essential to ensure that Hodge Laplacians ΔH indeed act as δ∂ + ∂δ and to decompose ΔH into a direct sum of operators acting on k-forms. Furthermore, it allows us to define relative cohomology classes, show a respective weak Hodge decomposition, and prove the existence of harmonic Dirichlet eigenforms. We also discuss a transience property for simplicial complexes, that was introduced by Parzanchevski and Rosenthal.