Methods for treating material and geometric nonlinearities by finite elements; transient analysis: explicit and implicit time integration, partitioned methods, and stability; hybrid and mixed elements ...

Finite element modelling is widely used in industry to solve an endless number of practical problems, often involving non-linearity and dynamic loading. This module will teach how to robustly develop ...

Journal of Computational Mathematics, Vol. 37, No. 1 (January 2019), pp. 1-17 (17 pages) This paper develops a framework to deal with the unconditional superclose analysis of nonlinear parabolic ...

Based on the low-order conforming finite element subspace (Vh,Mh) such as the P₁-P₀ triangle element or the Q₁-P₀ quadrilateral element, the locally stabilized finite element method for the Stokes ...

This course covers dual complimentary focus areas for advanced finite element driven modeling and simulation using non-linear computational material modeling, and data-driven approaches for the ...