Publication detail
A telescoping principle for oscillation of the second order half-linear dynamic equations on time scales
VÍTOVEC, J.
Original Title
A telescoping principle for oscillation of the second order half-linear dynamic equations on time scales
Type
journal article - other
Language
English
Original Abstract
We establish the so-called ``telescoping principle" for oscillation of the second order half-linear dynamic equation $$\Bl[r(t)\Phi\bl(x^{\Delta }\br)\Br]^\Delta + c(t)\Phi(x^\sigma)=0$$ on a time scale. This principle provides a method enabling us to construct many new oscillatory equations. Unlike previous works concerning the telescoping principle, we formulate some oscillation results under the weaker assumption $r(t)\not=0$ (instead $r(t)>0$).
Keywords
Half-linear dynamic equation; Telescoping principle; Oscillation criteria
Authors
VÍTOVEC, J.
RIV year
2009
Released
1. 11. 2009
ISBN
1210-3195
Periodical
Tatra Mountains Mathematical Publications
Year of study
43
Number
11
State
Czech Republic
Pages from
243
Pages to
255
Pages count
13
BibTex
@article{BUT50470,
author="Jiří {Vítovec}",
title="A telescoping principle for oscillation of the second order half-linear dynamic equations on time scales",
journal="Tatra Mountains Mathematical Publications",
year="2009",
volume="43",
number="11",
pages="243--255",
issn="1210-3195"
}