English

Verifying $k$-Contraction without Computing $k$-Compounds

Dynamical Systems 2022-09-05 v1

Abstract

Compound matrices have found applications in many fields of science including systems and control theory. In particular, a sufficient condition for kk-contraction is that a logarithmic norm (also called matrix measure) of the kk-additive compound of the Jacobian is uniformly negative. However, this may be difficult to check in practice because the kk-additive compound of an n×nn\times n matrix has dimensions (nk)×(nk)\binom{n}{k}\times \binom{n}{k}. For an n×nn\times n matrix AA, we prove a duality relation between the kk and (nk)(n-k) compounds of AA. We use this duality relation to derive a sufficient condition for kk-contraction that does not require the computation of any kk-compounds. We demonstrate our results by deriving a sufficient condition for kk-contraction of an nn-dimensional Hopfield network that does not require to compute any compounds. In particular, for k=2k=2 this sufficient condition implies that the network is 22-contracting and this implies a strong asymptotic property: every bounded solution of the network converges to an equilibrium point, that may not be unique. This is relevant, for example, when using the Hopfield network as an associative memory that stores patterns as equilibrium points of the dynamics.

Keywords

Cite

@article{arxiv.2209.01046,
  title  = {Verifying $k$-Contraction without Computing $k$-Compounds},
  author = {Omri Dalin and Ron Ofir and Eyal Bar Shalom and Alexander Ovseevich and Francesco Bullo and Michael Margaliot},
  journal= {arXiv preprint arXiv:2209.01046},
  year   = {2022}
}
R2 v1 2026-06-28T00:38:15.923Z