English

The Dimension Spectrum Conjecture for Planar Lines

Computational Complexity 2021-11-08 v3 Combinatorics

Abstract

Let La,bL_{a,b} be a line in the Euclidean plane with slope aa and intercept bb. The dimension spectrum \spec(La,b)\spec(L_{a,b}) is the set of all effective dimensions of individual points on La,bL_{a,b}. The dimension spectrum conjecture states that, for every line La,bL_{a,b}, the spectrum of La,bL_{a,b} contains a unit interval. In this paper we prove that the dimension spectrum conjecture is true. Let (a,b)(a,b) be a slope-intercept pair, and let d=min{dim(a,b),1}d = \min\{\dim(a,b), 1\}. For every s(0,1)s \in (0, 1), we construct a point xx such that dim(x,ax+b)=d+s\dim(x, ax + b) = d + s. Thus, we show that \spec(La,b)\spec(L_{a,b}) contains the interval (d,1+d)(d, 1+ d). Results of Turetsky , and Lutz and Stull, show that \spec(La,b)\spec(L_{a,b}) contain the endpoints dd and 1+d1+d. Taken together, [d,1+d]\spec(La,b)[d, 1 + d] \subseteq \spec(L_{a,b}), for every planar line La,bL_{a,b}.

Cite

@article{arxiv.2102.00134,
  title  = {The Dimension Spectrum Conjecture for Planar Lines},
  author = {D. M. Stull},
  journal= {arXiv preprint arXiv:2102.00134},
  year   = {2021}
}
R2 v1 2026-06-23T22:40:33.945Z