Deforming finite elements for the numerical solution of the nonlinear inverse heat conduction problem

A new method of solving multidimensional heat conduction problems is formulated. The developed space marching method allows to determine quickly and exactly unsteady temperature distributions in the construction elements of irregular geometry. The method which is based on temperature measurements at

The solution we proposed for the inverse problem' is evaluated. The study is based on Raynaud and Beck's paper,2 which provides test cases and simulation results for some common numerical inverse methods.

In this paper a procedure to solve the identiÿcation inverse problems for two-dimensional potential ÿelds is presented. The procedure relies on a boundary integral equation (BIE) for the variations of the potential, ux, and geometry. This equation is a linearization of the regular BIE for small chan

A number of improved finite-difference solutions of explicit form have been reported recently. The choice of a particular solution of these improved explicit forms is dependent on the value of the non-dimensional time step as well as whether the process involves cooling or heating. The conditions fo