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dc.contributor.authorNayak, T-
dc.contributor.authorGuru Prem Prasad, M-
dc.identifier.citationProceedings of The Second National Conference on Non-linear Systems and Dynamics, (NCNSD-2005), P 202-206, Aligarh Muslim University, Aligarh, February 24-26, 2005en
dc.descriptionCopyright for the paper belongs to Proceedings publisheren
dc.description.abstractIn the study of Complex Dynamical Systems, the evolution of the system is realized by the iteration of complex functions f : C ! ^C. The subset of C where ffngn>0 forms a normal family (in the sense of Montel) is called Fatou set of f. Certain kind of Fatou component, namely siegel disc have been discussed in this article. A siegel disc is shown to be a disjoint union of invariant curves. It is also shown that all limit functions of ffngn>0 are non-constant. Certain functions not having siegel discs in their Fatou set have been characterized.en
dc.format.extent150431 bytes-
dc.publisherAligarh Musilim University, Indiaen
dc.subjectComplex Dynamical Systemen
dc.subjectSiegel Disken
dc.subjectFatou Seten
dc.titleSiegel Discs in Complex Dynamicsen
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