Towards Almost Global Synchronization on the Stiefel Manifold

Abstract

A graph G is referred to as S1-synchronizing if, roughly speaking, the Kuramoto-like model whose interaction topology is given by G synchronizes almost globally. The Kuramoto model evolves on the unit circle, the 1-sphere S1. This paper concerns generalizations of the Kuramoto-like model and the concept of synchronizing graphs on the Stiefel manifold St(p,n). Previous work on state-space oscillators have largely been influenced by results and techniques that pertain to the S1-case. It has recently been shown that all connected graphs are Sn-synchronizing for all n≥2. The previous point of departure may thus have been overly conservative. The n-sphere is a special case of the Stiefel manifold, namely St(1,n+1). As such, it is natural to ask for the extent to which the results on Sn can be extended to the Stiefel manifold. This paper shows that all connected graphs are St(p,n)-synchronizing provided the pair (p,n) satisfies p≤ 2n3-1.