Smooth critical points of eigenvalues on the torus of magnetic perturbations of graphs

Abstract

Motivated by the nodal distribution universality conjecture for discrete operators on graphs and by the spectral analysis of their maximal abelian covers, we consider a family of Hermitian matrices hα obtained by varying the complex phases of individual matrix elements. This family is parametrized by a β-dimensional torus, where β is the first Betti number of the underlying graph. The eigenvalues of each matrix are ordered, enabling us to treat the k-th eigenvalue λk as a function on the torus. We classify the smooth critical points of λk, describe their structure and Morse index in terms of the support and nodal count, that is, the number of sign changes between adjacent vertices of the corresponding eigenvector. In general, the families under consideration exhibit critical submanifolds rather than isolated critical points. These critical manifolds appear frequently and cannot be removed through perturbations. We provide an algorithmic way of determining all critical submanifolds by investigating finitely many eigenvalue problems: the 2β real symmetric matrices hα in the family under consideration as well as their principal minors.