Please use this identifier to cite or link to this item: http://hdl.handle.net/2080/649

DC FieldValueLanguage
contributor.authorNayak, T-
contributor.authorRoy, A K-
date.accessioned2008-03-21T06:00:09Z-
date.available2008-03-21T06:00:09Z-
date.issued2006-
identifier.citationProceedings of the Third National Conference on Non-linear Systems and Dynamics, (NCNSD-2006), Ramanujan Institute for Advanced Study in Mathematics, University of Madras, February 6-8, 2006, P 171-174en
identifier.urihttp://hdl.handle.net/2080/649-
descriptionCopyright for the paper belongs to Proceedings Publisheren
description.abstractIn the present paper, we study the dynamics of the one parameter family of entire functions ff¸(z) = ¸f(z) : f(z) = J1(iz)=iz for z 2 C and ¸ is a non-zero real numberg where J1(z) is the Bessel function of the first kind of order one. We have found a critical parameter ¸¤ ¼ 2:598 and show that the Julia set of f¸ is a nowhere dense subset of the complex plane C for 0 < j¸j · ¸¤ and is equal to extended complex plane bC = C[f1g for j¸j > ¸¤. This sudden change in the Julia sets is known as explosion in the Julia sets or chaotic burst in the dynamics.en
format.extent240545 bytes-
format.mimetypeapplication/pdf-
language.isoen-
publisherAllied Publishersen
subjectComplex Dynamicsen
subjectJulia Seten
subjectChaotic Seten
titleExploding Julia sets in the dynamics of \$ f_{\lambda}(z)=\lambda J_{1}(iz)/izen
typeArticleen
Appears in Collections:Conference Papers

Files in This Item:

File Description SizeFormat