The 8th International Conference on Scientific Computing and Applications , 2012-04-01

Title : ( ESTIMATION OF THE STRENGTH OF THE TIME-DEPENDENT HEAT SOURCE USING TEMPERATURE DISTRIBUTION AT A POINT )

Authors: Asgar Bradaran Rahimi ,

Citation: BibTeX | EndNote

In this paper, the conjugate gradient method coupled with adjoint problem is used in order to solve the inverse heat conduction problem and estimation of the strength of the time- dependent heat source using the temperature distribution at a point. Also, the effect of noisy data on final solution is studied. The numerical solution of the governing equations is obtained by employing a finite-difference technique. For solving this problem the general coordinate method is used. We solve the inverse heat conduction problem of estimating the strength of the transient heat source, inside an irregular region. The irregular region in the physical domain (r, z) is transformed into a rectangle in the computational domain . The present formulation is general and can be applied to the solution of inverse heat conduction problems inside any region that can be mapped into a rectangle. The obtained results for few selected examples show the good accuracy of the presented method. Also the solutions have good stability even if the input data includes noise.

Keywords

, Time- dependent heat source, general coordinate, inverse
برای دانلود از شناسه و رمز عبور پرتال پویا استفاده کنید.

@inproceedings{paperid:1025065,
author = {Bradaran Rahimi, Asgar},
title = {ESTIMATION OF THE STRENGTH OF THE TIME-DEPENDENT HEAT SOURCE USING TEMPERATURE DISTRIBUTION AT A POINT},
booktitle = {The 8th International Conference on Scientific Computing and Applications},
year = {2012},
location = {Las Vegas, USA},
keywords = {Time- dependent heat source; general coordinate; inverse problem.},
}

[Download]

%0 Conference Proceedings
%T ESTIMATION OF THE STRENGTH OF THE TIME-DEPENDENT HEAT SOURCE USING TEMPERATURE DISTRIBUTION AT A POINT
%A Bradaran Rahimi, Asgar
%J The 8th International Conference on Scientific Computing and Applications
%D 2012

[Download]