Martin Stynes
Published 2013-06-21Version 1
Convection-diffusion problems arise in the modelling of many physical processes. Their typical solutions exhibit boundary and/or interior layers. Despite the linear nature of the differential operator, these problems pose still-unanswered questions to the numerical analyst. This talk will give a selective overview of numerical methods for the solution of convection-diffusion problems, while placing them in a historical context. It examines the principles that underpin the competing numerical techniques in this area and presents some recent developments.
Numerical methods for solution of singular integral equations
Taylor-series expansion based numerical methods: a primer, performance benchmarking and new approaches for problems with non-smooth solutions
On the relation of truncation and approximation errors for the set of solutions obtained by different numerical methods
![QR code for arXiv:1306.5172 [math.NA]](http://oss.arxitics.com/images/favicon.svg)