English

David maps and Hausdorff Dimension

Dynamical Systems 2007-05-23 v1 Complex Variables

Abstract

David maps are generalizations of classical planar quasiconformal maps for which the dilatation is allowed to tend to infinity in a controlled fashion. In this note we examine how these maps distort Hausdorff dimension. We show \vs {enumerate} [\bullet] Given α\alpha and β\beta in [0,2][0,2], there exists a David map ϕ:\CC\CC\phi:\CC \to \CC and a compact set Λ\Lambda such that \HdimΛ=α\Hdim \Lambda =\alpha and \Hdimϕ(Λ)=β\Hdim \phi(\Lambda)=\beta. \vs [\bullet] There exists a David map ϕ:\CC\CC\phi:\CC \to \CC such that the Jordan curve Γ=ϕ(\Sen)\Gamma=\phi (\Sen) satisfies \HdimΓ=2\Hdim \Gamma=2.\vs {enumerate} One should contrast the first statement with the fact that quasiconformal maps preserve sets of Hausdorff dimension 0 and 2. The second statement provides an example of a Jordan curve with Hausdorff dimension 2 which is (quasi)conformally removable.

Keywords

Cite

@article{arxiv.math/0212106,
  title  = {David maps and Hausdorff Dimension},
  author = {S. Zakeri},
  journal= {arXiv preprint arXiv:math/0212106},
  year   = {2007}
}

Comments

15 Pages, 5 figures