A comparative study of finite element methods for a class of harmonic map heat flow problems
By: Nam Anh Nguyen, Arnold Reusken
Potential Business Impact:
Makes computer pictures of shapes more accurate.
In this paper, we review and systematically compare three finite element discretization methods for a harmonic map heat flow problem from the unit disk in $\mathbb{R}^2$ to the unit sphere in $\mathbb{R}^3$ in an unified framework. Numerical tests validate the convergence rates in a regime of smooth solutions and are used to compare the methods in terms of computational efficiency. For one of the methods a discrete inf-sup stability result is derived.
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