An almost second order uniformly convergent scheme for a singularly perturbed initial value problem

An almost second order uniformly convergent scheme for a singularly perturbed initial value problem

In this paper a nonlinear singularly perturbed initial problem is considered. The behavior of the exact solution and its derivatives is analyzed, and this leads to the construction of a Shishkin-type mesh. On this mesh a hybrid difference scheme is proposed, which is a combination of the second orde...

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Veröffentlicht in:Numerical algorithms 2014-10, Vol.67 (2), p.457-476
Hauptverfasser: Cen, Zhongdi, Erdogan, Fevzi, Xu, Aimin
Format: Artikel
Sprache:eng
Schlagworte:
Algebra
Algorithms
Boundary value problems
Computer Science
Convergence
Derivatives
Exact solutions
Initial value problems
Mathematical analysis
Mathematical models
Nonlinearity
Norms
Numeric Computing
Numerical Analysis
Original Paper
Singular perturbation
Theory of Computation
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Beschreibung
Zusammenfassung:In this paper a nonlinear singularly perturbed initial problem is considered. The behavior of the exact solution and its derivatives is analyzed, and this leads to the construction of a Shishkin-type mesh. On this mesh a hybrid difference scheme is proposed, which is a combination of the second order difference schemes on the fine mesh and the midpoint upwind scheme on the coarse mesh. It is proved that the scheme is almost second-order convergent, in the discrete maximum norm, independently of singular perturbation parameter. Numerical experiment supports these theoretical results.
ISSN:1017-1398
1572-9265
DOI:10.1007/s11075-013-9801-0