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A characterization of (μ,ν)$(\mu,\nu)$‐dichotomies via admissibility

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  • Lucas Backes
  • Davor Dragičević

Abstract

We present a characterization of (μ,ν)$(\mu,\nu)$‐dichotomies in terms of the admissibility of certain pairs of weighted spaces for nonautonomous discrete time dynamics acting on Banach spaces. Our general framework enables us to treat various settings in which no similar result has been previously obtained as well as to recover and refine several known results. We emphasize that our results hold without any bounded growth assumption and the statements make no use of Lyapunov norms. Moreover, as a consequence of our characterization, we study the robustness of (μ,ν)$(\mu, \nu)$‐dichotomies, that is, we show that this notion persists under small but very general linear perturbations.

Suggested Citation

  • Lucas Backes & Davor Dragičević, 2025. "A characterization of (μ,ν)$(\mu,\nu)$‐dichotomies via admissibility," Mathematische Nachrichten, Wiley Blackwell, vol. 298(8), pages 2547-2569, August.
    • Handle: RePEc:bla:mathna:v:298:y:2025:i:8:p:2547-2569
    DOI: 10.1002/mana.70005
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