Gain-line graphs via G-phases and group representations

Abstract

Let G be an arbitrary group. We define a gain-line graph for a gain graph (,) through the choice of an incidence G-phase matrix inducing . We prove that the switching equivalence class of the gain function on the line graph L() does not change if one chooses a different G-phase inducing or a different representative of the switching equivalence class of . In this way, we generalize to any group some results proven by N. Reff in the abelian case. The investigation of the orbits of some natural actions of G on the set H of G-phases of allows us to characterize gain functions on , gain functions on L(), their switching equivalence classes and their balance property. The use of group algebra valued matrices plays a fundamental role and, together with the matrix Fourier transform, allows us to represent a gain graph with Hermitian matrices and to perform spectral computations. Our spectral results also provide some necessary conditions for a gain graph to be a gain-line graph.