Regularization strategies for a two-dimensional inverse heat conduction problem

We consider a two-dimensional inverse heat conduction problem for a slab. This is a severely ill-posed problem. Two regularization strategies, one based on the modification of the equation, the other based on the truncation of high frequency components, are proposed to solve the problem in the presence of noisy data. Error estimates show that the regularized solution is dependent continuously on the data and is an approximation of the exact solution of the two-dimensional inverse heat conduction problem. The relation of these two and other regularization strategies is also discussed.

[1]  Murray Imber,et al.  Temperature Extrapolation Mechanism for Two-Dimensional Heat Flow , 1974 .

[2]  N. Zabaras,et al.  AN ANALYSIS OF TWO-DIMENSIONAL LINEAR INVERSE HEAT TRANSFER PROBLEMS USING AN INTEGRAL METHOD , 1988 .

[3]  Dang Duc Trong,et al.  Nonhomogeneous heat equation: Identification and regularization for the inhomogeneous term , 2005 .

[4]  Diego A. Murio,et al.  The mollification method and the numerical solution of the inverse heat conduction problem by finite differences , 1989 .

[5]  Lectures on Cauchy problem , 1965 .

[6]  Pham Hoang Quan,et al.  Determination of a two-dimensional heat source: uniqueness, regularization and error estimate , 2006 .

[7]  D. Hào,et al.  A mollification method for ill-posed problems , 1994 .

[8]  W. Miranker A well posed problem for the backward heat equation , 1961 .

[9]  Diego A. Murio,et al.  The Mollification Method and the Numerical Solution of Ill-Posed Problems , 1993 .

[10]  Lars Eldén,et al.  Numerical solution of the sideways heat equation by difference approximation in time , 1995 .

[11]  J. Beck Nonlinear estimation applied to the nonlinear inverse heat conduction problem , 1970 .

[12]  Charles F. Weber,et al.  Analysis and solution of the ill-posed inverse heat conduction problem , 1981 .

[13]  Xiang-Tuan Xiong,et al.  Fourth-order modified method for the Cauchy problem for the Laplace equation , 2006 .

[14]  T. Yoshimura,et al.  Inverse heat-conduction problem by finite-element formulation , 1985 .

[15]  Fredrik Berntsson,et al.  Wavelet and Fourier Methods for Solving the Sideways Heat Equation , 1999, SIAM J. Sci. Comput..

[16]  Lijia Guo,et al.  A mollified space-marching finite-different algorithm for the two-dimensional inverse heat conduction problem with slab symmetry , 1991 .

[17]  Lars Eldén,et al.  Approximations for a Cauchy problem for the heat equation , 1987 .

[18]  Diego A. Murio,et al.  A mollified space marching finite differences algorithm for the inverse heat conduction problem with slab symmetry , 1990 .

[19]  Chu-Li Fu,et al.  Simplified Tikhonov and Fourier regularization methods on a general sideways parabolic equation , 2004 .

[20]  Xiang-Tuan Xiong,et al.  A modified method for a non-standard inverse heat conduction problem , 2006, Appl. Math. Comput..

[21]  Y. Liu,et al.  Numerical experiments in 2-D IHCP on bounded domains Part I: The “interior” cube problem , 1996 .

[22]  Teresa Regińska,et al.  Approximate solution of a Cauchy problem for the Helmholtz equation , 2006 .

[23]  A. Carasso Determining Surface Temperatures from Interior Observations , 1982 .

[24]  L. Eldén,et al.  Hyperbolic approximations for a Cauchy problem for the heat equation , 1988 .