English

Will Random Cone-wise Linear Systems Be Stable?

Mathematical Physics 2022-02-15 v2 Statistical Mechanics math.MP

Abstract

We consider a simple model for multidimensional cone-wise linear dynamics around cusp-like equilibria. We assume that the local linear evolution is either v=Av\mathbf{v}^\prime=\mathbb{A}\mathbf{v} or Bv\mathbb{B}\mathbf{v} (with A\mathbb{A}, B\mathbb{B} independently drawn a rotationally invariant ensemble of N×NN \times N matrices) depending on the sign of the first component of v\mathbf{v}. We establish strong connections with the random diffusion persistence problem. When NN \to \infty, we find that the Lyapounov exponent is non self-averaging, i.e. one can observe apparent stability and apparent instability for the same system, depending on time and initial conditions. Finite NN effects are also discussed, and lead to cone trapping phenomena.

Keywords

Cite

@article{arxiv.2201.01324,
  title  = {Will Random Cone-wise Linear Systems Be Stable?},
  author = {Théo Dessertaine and Jean-Philippe Bouchaud},
  journal= {arXiv preprint arXiv:2201.01324},
  year   = {2022}
}

Comments

5 pages, 4 figures

R2 v1 2026-06-24T08:40:14.424Z