Eigenvalues of the Hodge Laplacian on digraphs

Abstract

This paper aims to compute and estimate the eigenvalues of the Hodge Laplacians on directed graphs. We have devised a new method for computing Hodge spectra with the following two ingredients. (I) We have observed that the product rule does work for the so-called normalized Hodge operator, denoted by p(a), where a refers to the weight that is used to redefine the inner product in the spaces p. This together with the K\"unneth formula for product allows us to compute inductively the spectra of all normalized Hodge operators p(a) on Cartesian powers including n-cubes and n-tori. (II) We relate in a certain way the spectra of p and p(a) to those of operators Lp=∂ ∂ also acting on p. Knowing the spectra of p(a) for all values of p, we compute the spectra of Lp and then the spectra of p. This program yields the spectra of all operators p on all n-cubes and n-tori.