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On strongly decreasing solutions of cyclic systems of second-order nonlinear differential equations

Published online by Cambridge University Press:  02 September 2015

Jaroslav Jaroš
Affiliation:
Department of Mathematical Analysis and Numerical Mathematics, Faculty of Mathematics, Physics and Informatics, Comenius University, 842 48 Bratislava, Slovakia ([email protected])
Kusano Takaŝi
Affiliation:
Department of Mathematics, Faculty of Science, Hiroshima University, Higashi Hiroshima 739-8526, Japan ([email protected])

Abstract

The n-dimensional cyclic system of second-order nonlinear differential equations

is analysed in the framework of regular variation. Under the assumption that αi and βi are positive constants such that α1αn > β1βn and pi and qi are regularly varying functions, it is shown that the situation in which the system possesses decreasing regularly varying solutions of negative indices can be completely characterized, and moreover that the asymptotic behaviour of such solutions is governed by a unique formula describing their order of decay precisely. Examples are presented to demonstrate that the main results for the system can be applied effectively to some classes of partial differential equations with radial symmetry to provide new accurate information about the existence and the asymptotic behaviour of their radial positive strongly decreasing solutions.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2015 

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