English

Large Salem Sets Avoiding Nonlinear Configurations

Classical Analysis and ODEs 2026-01-14 v2

Abstract

We construct large Salem sets avoiding patterns, complementing previous constructions of pattern avoiding sets with large Hausdorff dimension. For a (possibly uncountable) family of uniformly Lipschitz functions {fi:(Td)n2Td}\{ f_i : (\mathbb{T}^d)^{n-2} \to \mathbb{T}^d \}, we obtain a Salem subset of Td\mathbb{T}^d with dimension d/(n1)d/(n-1) avoiding nontrivial solutions to the equation xnxn1=fi(x1,,xn2)x_n - x_{n-1} = f_i(x_1,\dots,x_{n-2}). For a countable family of smooth functions {fi:(Td)n1Td}\{ f_i : (\mathbb{T}^d)^{n-1} \to \mathbb{T}^d \} satisfying a modest geometric condition, we obtain a Salem subset of Td\mathbb{T}^d with dimension d/(n3/4)d/(n-3/4) avoiding nontrivial solutions to the equation xn=f(x1,,xn1)x_n = f(x_1,\dots,x_{n-1}). For a set ZTdnZ \subset \mathbb{T}^{dn} which is the countable union of a family of sets, each with lower Minkowski dimension ss, we obtain a Salem subset of Td\mathbb{T}^d of dimension (dns)/(n1/2)(dn - s)/(n - 1/2) whose Cartesian product does not intersect ZZ except at points with non-distinct coordinates.

Keywords

Cite

@article{arxiv.2110.09592,
  title  = {Large Salem Sets Avoiding Nonlinear Configurations},
  author = {Jacob Denson},
  journal= {arXiv preprint arXiv:2110.09592},
  year   = {2026}
}

Comments

39 pages, 1 figure

R2 v1 2026-06-24T06:59:23.973Z