Advanced Finite Element Method

This graduate-level course provides an in-depth treatment of advanced finite element formulations for solid mechanics and engineering applications. The course emphasizes theoretical foundations, numerical implementation, and modern research-oriented developments in computational mechanics.

Course Topics

Variational Formulations and Weak Forms of Boundary Value Problems
Weighted Residual Methods and Galerkin Approximation
Isoparametric Formulation and Higher-Order Elements
Nonlinear Finite Element Analysis (Material and Geometric Nonlinearity)
Newton–Raphson and Incremental-Iterative Methods
Finite Element Implementation and Numerical Integration
Error Estimation and Adaptive Mesh Refinement
Mixed and Hybrid Finite Element Formulations
Stabilized Methods and Locking Phenomena
Introduction to Extended Finite Element Method (XFEM)
Multiscale and Advanced Computational Techniques

Learning Objectives

Develop and derive advanced finite element formulations from first principles.
Implement nonlinear and advanced FEM algorithms.
Understand convergence, stability, and numerical consistency.
Analyze complex engineering systems using research-level FEM tools.

Software and Implementation

Students develop finite element codes in MATLAB and/or Python. Emphasis is placed on algorithmic clarity, modular implementation, and extension toward research-level applications.