A general method for the solution of inverse heat conduction problems with partially unknown system geometries

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DOI10.1016/0017-9310(86)90033-5zbMath0585.73196OpenAlexW2041302635MaRDI QIDQ1070907

Publication date: 1986

Published in: International Journal of Heat and Mass Transfer (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/0017-9310(86)90033-5

zbMATH Keywords

geometries stability convergence consistency uniqueness Cauchy problem Newton-Raphson method Laplace equation Neumann condition inverse heat conduction Dirichlet condition Robin conditions nonlinear algebraic equation general solution method condition imposed at unknown boundary first-order nonlinear, ordinary differential equation independent of the type of partially unknown system

Mathematics Subject Classification ID

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Related Items (8)

Numerical boundary identification for Helmholtz-type equations ⋮ An adaptive greedy technique for inverse boundary determination problem ⋮ Boundary reconstruction in two-dimensional steady state anisotropic heat conduction using a regularized meshless method ⋮ Regularized method of fundamental solutions for boundary identification in two-dimensional isotropic linear elasticity ⋮ BEM first-order regularisation method in linear elasticity for boundary identification. ⋮ Estimation for inner surface geometry of furnace wall using inverse process combined with grey prediction model ⋮ Detection of flaws in a two-dimensional body through measurement of surface temperatures and use of conjugate gradient method ⋮ A three-dimensional inverse geometry problem in estimating the space and time-dependent shape of an irregular internal cavity

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