Explores the local approach of the finite element method, covering elementary matrices, assembly operations, stiffness matrix, system of equations, and practical examples.
Explores a priori error estimation in the finite elements method, covering convergence analysis, orthogonality, weak formulations, and optimal precision.
Covers the generalization of the model problem in structural mechanics and explores equilibrium equations and the link between normal force and displacement.
Explores the weak formulation and Galerkin method in Finite Element Method applications, including boundary conditions and linear systems of equations.
