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Extremal mappings of finite distortion

Published online by Cambridge University Press:  19 October 2005

K. Astala
Affiliation:
Department of Mathematics, University of Helsinki, P.O. Box 4, Helsinki, FIN–00014, Finland. E-mail: kari.astala@helsinki.fi
T. Iwaniec
Affiliation:
Department of Mathematics, Syracuse University, Syracuse, NY 13244, USA. E-mail: tiwaniec@mailbox.syr.edu
G. J. Martin
Affiliation:
Institute of Information and Mathematical Sciences, Massey University, Albany, Auckland, New Zealand. E-mail: g.j.martin@massey.ac.nz
J. Onninen
Affiliation:
Department of Mathematics, University of Michigan, 525 East University, Ann Arbor, MI 48109, USA. E-mail: jonninen@umich.edu
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Abstract

The theory of mappings of finite distortion has arisen out of a need to extend the ideas and applications of the classical theory of quasiconformal mappings to the degenerate elliptic setting where one finds concrete applications in non-linear elasticity and the calculus of variations.

In this paper we initiate the study of extremal problems for mappings with finite distortion and extend the theory of extremal quasiconformal mappings by considering integral averages of the distortion function instead of its supremum norm. For instance, we show the following. Suppose that $f_o$ is a homeomorphism of the circle with $f_{o}^{-1} \in {\cal W}^{1/2, 2}$. Then there is a unique extremal extension to the disk which is a real analytic diffeomorphism with non-vanishing Jacobian determinant. The condition on $f_o$ is sharp.

Classically the mapping $f_o$ is assumed to be quasisymmetric. Then there is an extremal quasiconformal mapping with boundary values $f_o$, but it is not always unique and it is seldom smooth. Indeed, even when $f_o$ is quasisymmetric, the ${\cal L}^1$-minimiser for the distortion function will almost never be quasiconformal.

We further find that there are many new and unexpected phenomena concerning existence, uniqueness and regularity for these extremal problems where the functionals are polyconvex but typically not convex. These seem to differ markedly from phenomena observed when studying multi-well type functionals.

Type
Research Article
Copyright
2005 London Mathematical Society

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Footnotes

Astala was supported in part by the Academy of Finland, projects 34082 and 41933, Iwaniec by the National Science Foundation grants DMS-0301582 and DMS-0244297, Martin by the N.Z. Marsden Fund and the N.Z. Royal Society (James Cook Fellowship), and Onninen by the National Science Foundation grant DMS-0400611.