Title :
Notice of Retraction
An effective computational method for periodical model with small parameter
Author_Institution :
Sch. of Sci., Zhejiang Univ. of Sci. & Technol., Hangzhou, China
Abstract :
Notice of Retraction
After careful and considered review of the content of this paper by a duly constituted expert committee, this paper has been found to be in violation of IEEE´s Publication Principles.
We hereby retract the content of this paper. Reasonable effort should be made to remove all past references to this paper.
The presenting author of this paper has the option to appeal this decision by contacting TPII@ieee.org.
In this paper the equation with periodical condition and small parameter is considered. The equation will lose boundary condition and lead to large oscillation in boundary layer. The properties of the equation is studied firstly. The analytical solution is decomposed into the smooth component and the singular component. The asymptotic solution is proposed secondly. The asymptotic solution is used to solve the equation outside the boundary layer. Based on Shishkin-type mesh, fitted mesh method is presented for boundary layer thirdly. Error estimation of our method is studied finally.
Keywords :
boundary layers; boundary-value problems; error analysis; Shishkin type mesh; asymptotic solution; boundary layer; error estimation; fitted mesh method; periodical model; small parameter; Boundary conditions; Differential equations; Error analysis; asymptotic solution; error estimation; fitted mesh method; periodical condition;
Conference_Titel :
Advanced Computer Control (ICACC), 2010 2nd International Conference on
Conference_Location :
Shenyang
Print_ISBN :
978-1-4244-5845-5
DOI :
10.1109/ICACC.2010.5486826
