Detail publikace

Existence of Subdominant Positive Solutions of a Discrete Equations Delta(k+n)=-p(k)u(k).

Originální název

Existence of Subdominant Positive Solutions of a Discrete Equations Delta(k+n)=-p(k)u(k).

Anglický název

Existence of Subdominant Positive Solutions of a Discrete Equations Delta(k+n)=-p(k)u(k).

Jazyk

en

Originální abstrakt

A delaed discrete equation is considered. Sufficient conditions are formulated to guarantee the existence of subdominat positive solutions if goes to infinity. Except for the fact of existence of positive solutions, the upper estimation for them is given. The analysis shows that every positive solution of the indicated family of positive solutions tends to zero (if k goest to infinity) and estimation of the speed of this convergence is given.

Anglický abstrakt

A delaed discrete equation is considered. Sufficient conditions are formulated to guarantee the existence of subdominat positive solutions if goes to infinity. Except for the fact of existence of positive solutions, the upper estimation for them is given. The analysis shows that every positive solution of the indicated family of positive solutions tends to zero (if k goest to infinity) and estimation of the speed of this convergence is given.

BibTex


@inproceedings{BUT14029,
  author="Jaromír {Baštinec} and Josef {Diblík}",
  title="Existence of Subdominant Positive Solutions of a Discrete Equations Delta(k+n)=-p(k)u(k).",
  annote="A delaed discrete equation is considered. Sufficient conditions are formulated to guarantee the existence of subdominat positive solutions if goes to infinity. Except for the fact of existence of positive solutions, the upper estimation for them is given. The analysis shows that every positive solution of the indicated family of positive solutions tends to zero (if k goest to infinity) and estimation of the speed of this convergence is given.",
  address="VVŠ PV Vyškov",
  booktitle="XXII. International Colloquium on the Acquisition Process Management, CD ROM",
  chapter="14029",
  institution="VVŠ PV Vyškov",
  year="2004",
  month="may",
  pages="1",
  publisher="VVŠ PV Vyškov",
  type="conference paper"
}