中文

Input-to-State Stability Implications in Contraction Theory

系统与控制 2026-07-06 v1 最优化与控制

摘要

For nonlinear control systems on normed vector spaces, we characterize an incremental input-to-state stability (ISS) type property in which the overshoot constant multiplies both the initial-condition and the input terms. Working through the associated variational system, we show that two properties are equivalent: an ISS-type bound on the variational system, and the incremental ISS-type bound on the original system. We further establish the equivalence between an infinitesimal contraction condition, expressed through a Lyapunov-type function, and an incremental Lyapunov condition. Each of these equivalent conditions yields a necessary condition and a sufficient condition for the ISS-type bounds, differing only in the input Lipschitz constant of the vector field. When the overshoot constant equals one, the infinitesimal contraction condition reduces to the standard norm-based contraction conditions. We establish these implications under mere continuous differentiability of the vector field, and we illustrate the results through sensitivity matrices and Lyapunov characteristic exponents.

引用

@article{arxiv.2607.05640,
  title  = {Input-to-State Stability Implications in Contraction Theory},
  author = {Yu Kawano and Francesco Bullo},
  journal= {arXiv preprint arXiv:2607.05640},
  year   = {2026}
}