DocumentCode
2711086
Title
On an Asymptotic Case of the Complex Lorenz Model
Author
Das, Swetamber Prakash
Author_Institution
Dept. of Phys., Patna Univ., Patna, India
fYear
2010
fDate
7-10 May 2010
Firstpage
579
Lastpage
583
Abstract
In this paper The Complex Lorenz Model is considered and a particular asymptotic case has been analyzed. Fowler et al. (1982) has found this complex counterpart of the Lorenz Model and its analytic study was reported. Present paper deals with the stability analysis of the model for the simple condition when σ → ∞. We have followed the method used by Lorenz (1963) to study the set of differential equation modeling Nonperiodic flow followed by a brief study of large perturbation through numerical integration. We have been able to produce a few results in agreement with Fowler et al. (1983) and an important result regarding the critical value of one of the parameters.
Keywords
differential equations; flow instability; complex Lorenz model; critical value; differential equation; nonperiodic flow; numerical integration; stability analysis; Atmosphere; Atmospheric modeling; Differential equations; Dispersion; Laser modes; Laser theory; Nonlinear equations; Physics computing; Research and development; Stability analysis; Complex Lorenz Model; Limit Cycle; Lorenz Model;
fLanguage
English
Publisher
ieee
Conference_Titel
Computer Research and Development, 2010 Second International Conference on
Conference_Location
Kuala Lumpur
Print_ISBN
978-0-7695-4043-6
Type
conf
DOI
10.1109/ICCRD.2010.122
Filename
5489582
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