An error parameter in TLM diffusion modelling

We re-examine the potential drop method to give a direct estimation of the absolute error in transmissionline matrix (TLM) diffusion modelling. In particular, the open-circuit boundary is taken into account. Promising results are presented with a structure relevant to thermal analysis of semiconduct

The connection algorithms used in transmission-line matrix (TLM) modelling of diffusion processes for describing boundary conditions in both link-line and link-resistor nodal configurations have been derived. The new algorithms regarding the inhomogeneous Robin condition enhance the capability of th

The standard methods for bringing a TLM di!usion model to convergence are necessary but tedious. However, much time and e!ort can be saved if the initial choices of elemental size and iteration timestep are appropriate. Here we consider the general form of the solution to the di!usion equation and s

Redundancy in the simplest form of a two-dimensional TLM network is identified and a method of eliminating it is described. Results obtained using the non-redundant algorithm are compared with those derived from the standard, redundant algorithm. The non-redundant approach is extended to deal with n

## Abstract The commonly used transmission‐line modelling (TLM) network of one‐dimensional diffusion problems often results in unwanted oscillations. Two different TLM configurations (line boundary (LB) and resistance boundary (RB)), are investigated with some techniques necessary to reduce the osc

U . I(. ## 1. Introduction The application of the transmission line matrix method (TLM) to electromagnetic problems is well established. 1-5 More recently TLM has been applied to problems in diffusion.6 TLM has been applied successfully to thermal diffusion in one, and three dimensions.8 Results h