Discrete Hodge star operator on 3-manifolds

Abstract

Scott Wilson introduced the notion of combinatorial Hodge star operators on a compact oriented triangulated manifold M, which act on the singular cohomology ring of M. Such an operator depends on both a triangulation K of M and a metric on the simplicial cochain complex of K. Taking the discrete metric, we arrive at the notion of the discrete Hodge star operator for each pair (M, K). We prove, when M is a 3-manifold, that the discrete Hodge star operators acting on the cuspidal cohomology groups Hicusp(M, Q) are independent of K for i=1,2. As an application, we construct a canonical positive definite symmetric quadratic form on Hicusp(M, Q) for i=1,2. On the other hand, we will interpret our result from a point of view on the Langlands Program; we provide a supporting evidence for the conjecture of Prasanna and Venkatesh, which predicts a degree-shifting action of a motivic cohomology group on the cohomology ring of an arithmetic group.