Detail publikace

Two classes of positive solutions of a discrete equation

Originální název

Two classes of positive solutions of a discrete equation

Anglický název

Two classes of positive solutions of a discrete equation

Jazyk

en

Originální abstrakt

In the paper we study a class of linear discrete delayed equations with perturbations. Boundaries of perturbations guaranteeing the existence of a positive solution or a bounded vanishing solution of perturbed linear discrete delayed equation are given. In proofs of main results the discrete variant of Wazewski's topological method and method of asymptotic decompositions are utilized.

Anglický abstrakt

In the paper we study a class of linear discrete delayed equations with perturbations. Boundaries of perturbations guaranteeing the existence of a positive solution or a bounded vanishing solution of perturbed linear discrete delayed equation are given. In proofs of main results the discrete variant of Wazewski's topological method and method of asymptotic decompositions are utilized.

BibTex


@inproceedings{BUT142651,
  author="Jaromír {Baštinec} and Josef {Diblík}",
  title="Two classes of positive solutions of a discrete equation",
  annote="In the paper we study a class of linear discrete delayed equations with perturbations. Boundaries of perturbations guaranteeing the existence of a positive solution or a bounded vanishing solution of perturbed linear discrete delayed
equation are given. In proofs of main results the discrete variant of Wazewski's topological method and method of asymptotic decompositions are utilized.",
  booktitle="MITAV 2017 (Matematika, informační technologie a aplikované vědy), Post-conference proceedings of extended versions of selected papers",
  chapter="142651",
  howpublished="electronic, physical medium",
  year="2017",
  month="december",
  pages="21--32",
  type="conference paper"
}