Operator Splitting of the Kdv-Burgers Type Equation With Fast and Slow Dynamics
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Date
2010
Authors
Aydin, A.
Karasozen, B.
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Publisher
Amer inst Physics
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Abstract
The Korteweg de Vries-Burgers (KdV-Burgers) type equation arising from the discretization of the viscous Burgers equation with fast dispersion and slow diffusion is solved using operator splitting. The dispersive and diffusive parts are discretized in space by second order conservative finite differences. The resulting system of ordinary differential equations are composed using the time reversible Strang splitting. The numerical results reveal that the periodicity of the solutions and the invariants of the KdV-Burgers equation are well preserved.
Description
Karasozen, Bulent/0000-0003-1037-5431
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Keywords
fast-slow systems, finite differences, splitting methods
Turkish CoHE Thesis Center URL
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Citation
1
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Scopus Q
Q4
Source
International Conference on Mathematical Sciences -- NOV 23-27, 2010 -- Abant Izzet Baysal Univ, Bolu, TURKEY
Volume
1309
Issue
Start Page
562
End Page
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