Large Sets with Small Injective Projections
Abstract
Let be a countable collection of lines in . For any we construct a compact set with Hausdorff dimension which projects injectively into each , such that the image of each projection has dimension . This immediately implies the existence of homeomorphisms between certain Cantor-type sets whose graphs have large dimensions. As an application, we construct a collection of disjoint, non-parallel -planes in , for , whose union is a small subset of , either in Hausdorff dimension or Lebesgue measure, while itself has large dimension. As a second application, for any countable collection of vertical lines in the plane we construct a collection of nonvertical lines , so that , the union of lines in , has positive Lebesgue measure, but each point of each line intersects at most one and, for each , the Hausdorff dimension of is zero.
Cite
@article{arxiv.1906.06288,
title = {Large Sets with Small Injective Projections},
author = {Frank Coen and Nate Gillman and Tamás Keleti and Dylan King and Jennifer Zhu},
journal= {arXiv preprint arXiv:1906.06288},
year = {2021}
}
Comments
The presentation of the construction and the argument in Section 4 was completely rewritten