Detail publikace

Asymptotic behavior of positive solutions of differential equations with state delay

Originální název

Asymptotic behavior of positive solutions of differential equations with state delay

Anglický název

Asymptotic behavior of positive solutions of differential equations with state delay

Jazyk

en

Originální abstrakt

A differential equation $\dot{y}(t)=-c(t)y(t-\tau(t,y(t)))$, where $t\ge t_0\in \mathbb{R}$, with state-dependent delay represented by the function $\tau$, is considered. Existence of positive solutions for $t\to\infty$ is discussed.

Anglický abstrakt

A differential equation $\dot{y}(t)=-c(t)y(t-\tau(t,y(t)))$, where $t\ge t_0\in \mathbb{R}$, with state-dependent delay represented by the function $\tau$, is considered. Existence of positive solutions for $t\to\infty$ is discussed.

BibTex


@misc{BUT138660,
  author="Josef {Diblík} and Gabriela {Vážanová}",
  title="Asymptotic behavior of positive solutions of differential equations with state delay
",
  annote="A differential equation $\dot{y}(t)=-c(t)y(t-\tau(t,y(t)))$,  where $t\ge t_0\in  \mathbb{R}$, with state-dependent delay represented by the function $\tau$, is considered. Existence of positive solutions for $t\to\infty$ is discussed.",
  address="Ariel University",
  booktitle="6th Ariel Conference on Functional Differential Equations and Applications",
  chapter="138660",
  howpublished="print",
  institution="Ariel University",
  year="2017",
  month="august",
  pages="14--14",
  publisher="Ariel University",
  type="abstract"
}