Combined mollification - future temperatures procedure for solution of inverse heat conduction problem
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Publication:1119380
DOI10.1016/0377-0427(88)90282-8zbMath0671.65103OpenAlexW2091527563MaRDI QIDQ1119380
Jorge R. Paloschi, Diego A. Murio
Publication date: 1988
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0377-0427(88)90282-8
Heat equation (35K05) Inverse problems for PDEs (35R30) Thermodynamics of continua (80A17) Applications to the sciences (65Z05) Numerical solution of discretized equations for boundary value problems involving PDEs (65N22)
Related Items (9)
The inverse solution of the coupled nonlinear reaction–diffusion equations by the Haar wavelets ⋮ Solving an inverse heat conduction problem using genetic algorithm: sequential and multi-core parallelization approach ⋮ A meshless method to the solution of an ill-posed problem ⋮ Solving an inverse initial-boundary-value problem using basis function method ⋮ Applications of Haar basis method for solving some ill-posed inverse problems ⋮ An efficient adaptive boundary algorithm to reconstruct Neumann boundary data in the MFS for the inverse Stefan problem ⋮ A method of fundamental solutions for the one-dimensional inverse Stefan problem ⋮ Filter digital form of two future temperature methods for the inverse heat conduction: A spectral comparison ⋮ Cubic B-spline method for the solution of an inverse parabolic system
Cites Work
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- Parameter selection by discrete mollification and the numerical solution of the inverse heat conduction problem
- Calculation of the surface temperature and heat flux on one side of a wall from measurements on the opposite side
- Combined function specification-regularization procedure for solution of inverse heat conduction problem
- The Mollification Method and the Numerical Solution of an Inverse Heat Conduction Problem
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