The behaviour of mechanics problems can be modelled by differential equations (DEs). in solving DEs, one needs to express the field variables as linear combinations of nodal function values. Compact local approximations, where nodal values of DEs are also included, allow the achievement of high levels of accuracy of the solution and sparseness of the system matrix together. This project is concerned with the use of compact local approximations, based on integrated radial basis functions, to represent the field variables in DEs to enhance the efficiency of numerical solution procedures.

Professor Nam Mai-Duy

• Computational Engineering and Science Research Centre
• Institute for Agriculture and the Environment
• School of Engineering

• Applied Mathematics
• Interdisciplinary Engineering
• Numerical and Computational Mathematics

• Doctor of Philosophy (DPHD)