English

Co-analytic Counterexamples to Marstrand's Projection Theorem

Logic 2023-01-18 v1

Abstract

Assuming V=LV=L, we construct a plane set EE of Hausdorff dimension 11 whose every orthogonal projection onto straight lines through the origin has Hausdorff dimension 00. This is a counterexample to J. M. Marstrand's seminal projection theorem. While counterexamples had already been constructed decades ago, initially by R. O. Davies, the novelty of our result lies in the fact that EE is co-analytic. Following Marstrand's original proof (and R. Kaufman's newer, and now standard, approach based on capacities), a counterexample to the projection theorem cannot be analytic, hence our counterexample is optimal. We then extend the result in a strong way: we show that for each ϵ(0,1)\epsilon \in (0, 1) there exists a co-analytic set EϵE_{\epsilon} of dimension 1+ϵ1 + \epsilon, each of whose orthogonal projections onto straight lines through the origin has Hausdorff dimension ϵ\epsilon. The constructions of EE and EϵE_{\epsilon} are by induction on the countable ordinals, applying a theorem by Z. Vidnyanszky.

Keywords

Cite

@article{arxiv.2301.06684,
  title  = {Co-analytic Counterexamples to Marstrand's Projection Theorem},
  author = {Linus Richter},
  journal= {arXiv preprint arXiv:2301.06684},
  year   = {2023}
}

Comments

35 pages, 3 figures

R2 v1 2026-06-28T08:13:00.618Z