Starting in the spring 2013, I videotaped the lectures for my MATH 676: Finite element methods in scientific computing course at the KAMU TV studio at Texas A&M. These are lectures on many aspects of scientific computing, software, and the practical aspects of the finite element method, as well as their implementation in the deal.II software library. Support for creating these videos was also provided by the National Science Foundation and the Computational Infrastructure in Geodynamics.

The videos are part of a broader effort to develop a modern way of teaching Computational Science and Engineering (CS&E) courses. If you are interested in adapting our approach, you may be interested in this paper I wrote with a number of education researchers about the structure of such courses and how they work.

Note 1: In some of the videos, I demonstrate code or user interfaces. If you can't read the text, change the video quality by clicking on the "gear" symbol at the bottom right of the YouTube player.

Note 2: deal.II is an actively developed library, and in the course of this development we occasionally deprecate and remove functionality. In some cases, this implies that we also change tutorial programs, but the nature of videos is that this is not reflected in something that may have been recorded years ago. If in doubt, consult the current version of the tutorial.

Lecture 3.92: The ideas behind the finite element method. Part 3: Piecewise polynomial approximation in 2d/3d

The previous two lectures argued that piecewise polynomial approximation is what we should use to approximate the kinds of functions we get as solutions of partial differential equations. I then showed how this is done in one space dimension, namely breaking the domain into small intervals and then defining a polynomial approximant on each interval.

In this lecture, I show how this is done in two and three space dimensions: Namely, by breaking the domain into "cells" that jointly form a "mesh" or "triangulation", and then representing the solution as piecewise polynomials.