论文信息 - Reconstruction of an unknown boundary portion from Cauchy data in n dimensions

Reconstruction of an unknown boundary portion from Cauchy data in n dimensions

We consider the inverse problem of determining the shape of some inaccessible portion of the boundary of a region in n dimensions from Cauchy data for the heat equation on an accessible portion of the boundary. The inverse problem is quite ill-posed and nonlinear. We develop a Newton-like algorithm for solving the problem, with a simple and efficient means for computing the required derivatives, develop methods for regularizing the process, and provide computational examples.

Kurt Bryan | Lester Caudill | K. Bryan | L. Caudill

[1] Fumio Kojima,et al. Boundary Shape Identification Problems in Two-Dimensional Domains Related to Thermal Testing of Materials. , 1989 .

[2] S. Vessella,et al. Quantitative estimates of unique continuation for parabolic equations and inverse initial-boundary value problems with unknown boundaries , 2001 .

[3] Harvey Thomas Banks,et al. Boundary estimation problems arising in thermal tomography , 1989 .

[4] Fadil Santosa,et al. Resolution and Stability Analysis of an Inverse Problem in Electrical Impedance Tomography: Dependence on the Input Current Patterns , 1994, SIAM J. Appl. Math..

[5] Kurt Bryan,et al. Stability and reconstruction for an inverse problem for the heat equation , 1998 .

[6] K. Bryan,et al. Uniqueness for a Boundary Identification Problem in Thermal Imaging , 1996 .

[7] O. A. Ladyzhenskai︠a︡,et al. Linear and Quasi-linear Equations of Parabolic Type , 1995 .

[8] Rainer Kress,et al. An inverse boundary value problem for the heat equation: the Neumann condition , 1999 .

[9] S. Vessella. Stability estimates in an inverse problem for a three-dimensional heat equation , 1997 .

[10] Stability and Resolution in Thermal Imaging , 1995 .

[11] Kurt Bryan,et al. An Inverse Problem in Thermal Imaging , 1994, SIAM J. Appl. Math..