Publication detail
Bifurcation of positive periodic solutions to non-autonomous undamped Duffing equations
ŠREMR, J.
English title
Bifurcation of positive periodic solutions to non-autonomous undamped Duffing equations
Type
journal article in Scopus
Language
en
Original abstract
We study a bifurcation of positive solutions to the parameter-dependent periodic problem u''=p(t)u−h(t)|u|^λ sgn u+µf(t); u(0)=u(ω), u'(0)=u'(ω), where λ>1, p, h, f∈L([0, ω]), and µ∈R is a parameter. Both the coefficient p and the forcing term f may change their signs, h≥0 a. e. on [0, ω]. We provide sharp conditions on the existence and multiplicity as well as non-existence of positive solutions to the given problem depending on the choice of the parameter µ.
English abstract
We study a bifurcation of positive solutions to the parameter-dependent periodic problem u''=p(t)u−h(t)|u|^λ sgn u+µf(t); u(0)=u(ω), u'(0)=u'(ω), where λ>1, p, h, f∈L([0, ω]), and µ∈R is a parameter. Both the coefficient p and the forcing term f may change their signs, h≥0 a. e. on [0, ω]. We provide sharp conditions on the existence and multiplicity as well as non-existence of positive solutions to the given problem depending on the choice of the parameter µ.
Keywords in English
periodic solution;second-order differential equation;Duffing equation;existence;multiplicity;bifurcation;positive solution
Released
29.06.2021
Publisher
Institute of Mathematics, Brno University of Technology
Location
Česká republika
ISSN
1805-3610
Volume
10
Number
1
Pages from–to
79–92
Pages count
14
BIBTEX
@article{BUT171908,
author="Jiří {Šremr},
title="Bifurcation of positive periodic solutions to non-autonomous undamped Duffing equations",
year="2021",
volume="10",
number="1",
month="June",
pages="79--92",
publisher="Institute of Mathematics, Brno University of Technology",
address="Česká republika",
issn="1805-3610"
}