Finite element approximations of harmonic map heat flows and wave maps into spheres of nonconstant radii |
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| Authors: | L’ubomír Baňas Andreas Prohl Reiner Schätzle |
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| Affiliation: | (1) Department of Mathematics, The University of Queensland, St Lucia, QLD, 4072, Australia;(2) Courant Institute of Mathemtical Sciences, New York University, New York, NY 10012, USA |
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| Abstract: | We prove the existence of weak solutions to the harmonic map heat flow, and wave maps into spheres of nonconstant radii. Weak solutions are constructed as proper limits of iterates from a fully practical scheme based on lowest order conforming finite elements, where discrete Lagrange multipliers are employed to exactly meet the sphere constraint at mesh-points. Computational studies are included to motivate interesting dynamics in two and three spatial dimensions. |
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