Solution of one-dimensional non-linear heat-conduction problems on an isothermal mesh

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

A model is presented for the inverse determination of the strength of a temporal±spatial-dependent heat source in the one-dimensional heat conduction problem. This model is constructed from the ®nite dierence approximation of the dierential heat conduction equation based on the assumption that the t

A novel algorithm for handling material non-linearities in bodies consisting of subregions having different, temperature dependent heat conductivities is developed. The technique is based on Kirchhoffs transformation. The material non-linearity is reduced to a solution dependent function of unified

## Abstract The aim of this communication is to compare different algorithms for the solution of the 1‐D non‐linear heat equation. A standard finite‐element method is implemented for the space discretization which transforms the initial problem into a non‐linear ordinary differential system. This n