On the density of eigenvalues on periodic graphs

Abstract

Suppose that =(V,E) is a graph with vertices V, edges E, a free group action on the vertices Zd V with finitely many orbits, and a linear operator D on the Hilbert space l2(V) such that D commutes with the group action. Fix λ ∈ R in the pure-point spectrum of D and consider the vector space of all eigenfunctions of finite support K. Then K is a non-trivial finitely generated module over the ring of Laurent polynomials, and the density of λ is given by an Euler-characteristic type formula by taking a finite free resolution of K. Furthermore, these claims generalize under suitable assumptions to the non-commutative setting of a finite generated amenable group acting on the vertices freely with finitely many orbits, and commuting with the operator D.