Numerical Methods for Partial Differential Equations Basic Information M134 (3+2+0) - 7 ECTS credits To familiarize students with the theory and numerical methods for solving partial differential equations. You can access the course content at the following link: PDF Teachers Basic literature J. C. Strikwerda, Finite Difference Schemes and Partial differential equations, The Wadsworth & Brooks/Cole Advanced Book and Software, Pacific Grove, 1989. A. Quateroni, A. Valli, Numerical Approximation of Partial Differential Equations, Springer Series in Computational Mathematics Vol. 23, Springer Verlag,1994. P. Knabner, L. Angerman, Numerical methods for elliptic and Parabolic PDEs, Springer Verlag, 2003. R. LeVeque, Numerical Methods for Conservation Laws, Lecture Notes in Mathematics, Birkhäuser, Basel, 1992. Additional literature J. W. Thomas, Numerical Partial Differential Equations, Finite Difference Methods, Springer Verlag, 1995. G. Evans, J. Blackledge, P.Yardley, Numerical Methods for Partial Differential Equations, Springer, 1999. M. S.Gockenbach, Partial differential equations: analytical and numerical methods, SIAM: Society for Industrial and Applied Mathematics, 2002. C. Johnson, Numerical solutions of partial differential equations by the finite element method, Cambridge University Press, 1987. J. A. Trangenstein, Numerical solution of hyperbolic partial differential equations, Cambridge University Press, 2007. L. C. Evans, Partial differential equations, AMS, 1998. Teaching materials The materials are available on the internal Teams channel of the course, through which all internal communication takes place. Students are required to register on the course’s Teams channel. The channel code for joining the course can be found in the schedule.