English

Weak and Semi-Contraction for Network Systems and Diffusively-Coupled Oscillators

Systems and Control 2020-10-06 v8 Systems and Control Optimization and Control

Abstract

We develop two generalizations of contraction theory, namely, semi-contraction and weak-contraction theory. First, using the notion of semi-norm, we propose a geometric framework for semi-contraction theory. We introduce matrix semi-measures and characterize their properties. We show that the spectral abscissa of a matrix is the infimum over weighted semi-measures. For dynamical systems, we use the semi-measure of their Jacobian to characterize the contractivity properties of their trajectories. Second, for weakly contracting systems, we prove a dichotomy for the asymptotic behavior of their trajectories and novel sufficient conditions for convergence to an equilibrium. Third, we show that every trajectory of a doubly-contracting system, i.e., a system that is both weakly and semi-contracting, converges to an equilibrium point. Finally, we apply our results to various important network systems including affine averaging and affine flow systems, continuous-time distributed primal-dual algorithms, and networks of diffusively-coupled dynamical systems. For diffusively-coupled systems, the semi-contraction theory leads to a sufficient condition for synchronization that is sharper, in general, than previously-known tests.

Keywords

Cite

@article{arxiv.2005.09774,
  title  = {Weak and Semi-Contraction for Network Systems and Diffusively-Coupled Oscillators},
  author = {Saber Jafarpour and Pedro Cisneros-Velarde and Francesco Bullo},
  journal= {arXiv preprint arXiv:2005.09774},
  year   = {2020}
}
R2 v1 2026-06-23T15:40:29.375Z