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Mappings with Integrable Dilatation in Higher Dimensions

Complex Variables 2016-09-06 v1 Analysis of PDEs

Abstract

Let FWloc1,n(Ω;Rn)F\in W^{1,n}_{\text{loc}}(\Omega; \Bbb R^n) be a mapping with nonnegative Jacobian JF(x)=detDF(x)0J_F(x)=\det DF(x)\ge 0 for a.e. xx in a domain ΩRn\Omega\subset\Bbb R^n. The {\it dilatation} of FF is defined (almost everywhere in Ω\Omega) by the formula K(x)=DF(x)nJF(x)K(x)=\frac{|DF(x)|^n}{J_F(x)}\cdot Iwaniec and \v Sver\' ak \ncite{IS} have conjectured that if pn1p\ge n-1 and KLlocp(Ω)K\in L^{p}_{\text{loc}}(\Omega) then FF must be continuous, discrete and open. Moreover, they have confirmed this conjecture in the two-dimensional case n=2n=2. In this article, we verify it in the higher- dimensional case n2n\ge 2 whenever p>n1p>n-1.

Keywords

Cite

@article{arxiv.math/9504225,
  title  = {Mappings with Integrable Dilatation in Higher Dimensions},
  author = {Juan J. Manfredi and Enrique Villamor},
  journal= {arXiv preprint arXiv:math/9504225},
  year   = {2016}
}

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6 pages