Numerical nonlinear inverse problem of determining wall heat flux

Autor:	Joaquín Zueco, Francisco Alhama, C.F. González Fernández
Rok vydání:	2004
Předmět:	Fluid Flow and Transfer Processes Physics Heat flux Mathematical analysis Boundary (topology) Flux Thermodynamics Boundary value problem Function (mathematics) Inverse problem Condensed Matter Physics Thermal conduction Constant (mathematics)
Zdroj:	Heat and Mass Transfer. 41:411-418
ISSN:	1432-1181 0947-7411
DOI:	10.1007/s00231-004-0553-1
Popis:	The inverse problem of determining time-variable surface heat flux in a plane wall, with constant or temperature dependent thermal properties, is numerically studied. Different kinds of incident heat flux, including rectangular waveform, are assumed. The solution is numerically solved as a function estimation problem, so that no a priori information for the functional waveforms of the unknown heat flux is needed. In all cases, a solution in the form of a piece-wise function is used to approach the incident flux. Transient temperature measurements at the boundary, from the solution of the direct problem, served as the simulated experimental data needed as input for the inverse analysis. Both direct and inverse heat conduction problems are solved using the network simulation method. The solution is obtained step-by-step by minimising the classical functional that compares the above input data with those obtained from the solution of the inverse problem. A straight line of variable slope and length is used for each one of the stretches of the desired solution. The influence of random error, number of functional terms and the effect of sensor location are studied. In all cases, the results closely agree with the solution.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::635892212ad939433241d1ebd254b173 https://doi.org/10.1007/s00231-004-0553-1 Zobrazit plný text záznamu Full text from SpringerLink