A finite difference solution of non-linear systems of radiative–conductive heat transfer equations

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

von Rosenberg developed an explicit finite-difference scheme for solution of the linear convection-conduction partial differential equation in one space dimension. The method is stable and accurate when a dimensionless ratio of dispersion to convection is between zero and one. In this work, the von

## 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

## Abstract We present the mathematical equations that govern heat transfer in a polymer melt flowing in a circular tube with constant ambient temperature, taking into account the viscous dissipation effects. This leads to a nonlinear parabolic partial differential equation. It is shown that the ex