L-Infininity Variational Problems for Maps and the Aronsson PDE System
Abstract
By employing Aronsson's Absolute Minimizers of functionals, we prove that Absolutely Minimizing Maps solve a "tangential" Aronsson PDE system. By following Sheffield-Smart \cite{SS}, we derive with respect to the dual operator norm and show that such maps miss information along a hyperplane when compared to Tight Maps. We recover the lost term which causes non-uniqueness and derive the complete Aronsson system which has \emph{discontinuous coefficients}. In particular, the Euclidean -Laplacian is where is the projection on the null space of . We exibit solutions having interfaces along which the rank of their gradient is discontinuous and propose a modification with coefficients which admits \emph{varifold solutions}. Away from the interfaces, Aronsson Maps satisfy a structural property of local splitting to 2 phases, an horizontal and a vertical; horizontally they possess gradient flows similar to the scalar case and vertically solve a linear system coupled by a scalar Hamilton Jacobi PDE. We also construct singular -Harmonic local diffeomorphisms and singular Aronsson Maps.
Cite
@article{arxiv.1105.4518,
title = {L-Infininity Variational Problems for Maps and the Aronsson PDE System},
author = {Nikolaos I. Katzourakis},
journal= {arXiv preprint arXiv:1105.4518},
year = {2012}
}
Comments
17 pages, 2 figures, revised