A thin conducting plate has an inaccessible side in contact with aggressive external agents. On the other side, we are able to heat the plate and take temperature maps in laboratory conditions. Detecting and evaluating damages on the inaccessible side from thermal data requires the solution of a nonlinear inverse problem for the heat equation in presence of suitable boundary conditions for heat equation. We carry on this task using domain derivative and integral formulation of the corresponding boundary value problem. Under non restrictive hypothesis, we find explicit regularized schemes for Fourier reconstruction of damages.
Domain derivative approach to active infrared thermography
Bison P;Inglese G
2010
Abstract
A thin conducting plate has an inaccessible side in contact with aggressive external agents. On the other side, we are able to heat the plate and take temperature maps in laboratory conditions. Detecting and evaluating damages on the inaccessible side from thermal data requires the solution of a nonlinear inverse problem for the heat equation in presence of suitable boundary conditions for heat equation. We carry on this task using domain derivative and integral formulation of the corresponding boundary value problem. Under non restrictive hypothesis, we find explicit regularized schemes for Fourier reconstruction of damages.File in questo prodotto:
Non ci sono file associati a questo prodotto.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
