Rotating periodic solutions for second order systems with Hartman-type nonlinearity

Jian Li; Xiaojun Chang; Yong Li

doi:10.1186/s13661-018-0955-5

Boundary Value Problems (Mar 2018)

Rotating periodic solutions for second order systems with Hartman-type nonlinearity

Jian Li,
Xiaojun Chang,
Yong Li

Affiliations

Jian Li: School of Mathematics and Statistics & Center for Mathematics and Interdisciplinary Sciences, Northeast Normal University
Xiaojun Chang: School of Mathematics and Statistics & Center for Mathematics and Interdisciplinary Sciences, Northeast Normal University
Yong Li: School of Mathematics and Statistics & Center for Mathematics and Interdisciplinary Sciences, Northeast Normal University

DOI: https://doi.org/10.1186/s13661-018-0955-5
Journal volume & issue: Vol. 2018, no. 1
pp. 1 – 11

Abstract

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Abstract In this paper, by a constructive proof based on the homotopy continuation method, we prove that the second order system x″=g(t,x) $x''=g(t,x)$ admits rotating periodic solutions with form u(t+T)=Qu(t) $u(t+T)=Qu(t)$ for any orthogonal matrix Q when the nonlinearity g admits the Hartman-type condition.

Published in Boundary Value Problems

ISSN: 1687-2762 (Print); 1687-2770 (Online)
Publisher: SpringerOpen
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics: Analysis
Website: http://www.boundaryvalueproblems.com/

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