Meso-scale obstructions to stability of 1D center manifolds for networks of coupled differential equations with symmetric Jacobian

Abstract

A linear system x = Ax, A ∈ Rn × n, x ∈ Rn, with rk A = n-1, has a one-dimensional center manifold Ec = \v ∈ Rn : Av=0\. If a differential equation x = f(x) has a one-dimensional center manifold Wc at an equilibrium x* then Ec is tangential to Wc with A = Df(x*) and for stability of Wc it is necessary that A has no spectrum in C+, i.e.\ if A is symmetric, it has to be negative semi-definite. We establish a graph theoretical approach to characterize semi-definiteness. Using spanning trees for the graph corresponding to A, we formulate meso-scale conditions with certain principal minors of A which are necessary for semi-definiteness. We illustrate these results by the example of the Kuramoto model of coupled oscillators.