English

Bohl-Perron type stability theorems for linear difference equations with infinite delay

Dynamical Systems 2012-11-29 v1 Classical Analysis and ODEs

Abstract

Relation between two properties of linear difference equations with infinite delay is investigated: (i) exponential stability, (ii) \lp\l^p-input \lq\l^q-state stability (sometimes is called Perron's property). The latter means that solutions of the non-homogeneous equation with zero initial data belong to \lq\l^q when non-homogeneous terms are in \lp\l^p. It is assumed that at each moment the prehistory (the sequence of preceding states) belongs to some weighted \lr\l^r-space with an exponentially fading weight (the phase space). Our main result states that (i) \Leftrightarrow (ii) whenever (p,q)(1,)(p,q) \neq (1,\infty) and a certain boundedness condition on coefficients is fulfilled. This condition is sharp and ensures that, to some extent, exponential and \lp\l^p-input \lq\l^q-state stabilities does not depend on the choice of a phase space and parameters pp and qq, respectively. \l1\l^1-input \l\l^\infty-state stability corresponds to uniform stability. We provide some evidence that similar criteria should not be expected for non-fading memory spaces.

Keywords

Cite

@article{arxiv.1009.6163,
  title  = {Bohl-Perron type stability theorems for linear difference equations with infinite delay},
  author = {Elena Braverman and Illya M. Karabash},
  journal= {arXiv preprint arXiv:1009.6163},
  year   = {2012}
}

Comments

To be published in Journal of Difference Equations and Applications

R2 v1 2026-06-21T16:21:42.749Z