Finite Element Methods
Fall 2016

Prof. Dr. Ronald H.W. Hoppe


Finite Element Methods are widely used discretization techniques for the numerical solution of PDEs based on appropriate variational formulations. We begin with basic principles for the construction of Conforming Finite Elements and Finite Element Spaces with respect to triangulations of the computational domain. Then, we study in detail a priori estimates for the global discretization error in various norms of the underlying function space. Nonconforming and Mixed Finite Element Methods will be addressed as well. A further important issue is adaptive grid refinement on the basis of efficient and reliable a posteriori error estimators for the global discretization error.


Calculus, Linear Algebra, Numerical Analysis


D.Braess; Finite Elements. Theory, Fast Solvers and Application in Solid Mechanics. 2nd Edition. Cambridge Univ. Press, Cambridge, 2001
S.C. Brenner and L.Ridgway Scott; The Mathematical Theory of Finite Element Methods. 2nd Edition. Springer, New York, 2002
P.G. Ciarlet;The Finite Element Method for Elliptic Problems. Reprint. SIAM, Philadelphia, 2002

Time table:
Monday 1:00 - 2:30 pm Room 129 MH
Wednesday 1:00 - 2:30 pm Room 129 MH

Chapter 1
Chapter 2
Chapter 3
Chapter 4
Chapter 5
Chapter 6
Chapter 7
Chapter 8


Prof. Dr. Ronald H.W. Hoppe
Office: 669 PGH