English

Counting Problems for Orthogonal Sets and Sublattices in Function Fields

Combinatorics 2026-02-24 v2 Number Theory

Abstract

Let K=Fq((x1))\mathcal{K}=\mathbb{F}_q((x^{-1})). Analogous to orthogonality in the Euclidean space Rn\mathbb{R}^n, there exists a well-studied notion of ultrametric orthogonality in Kn\mathcal{K}^n. In this paper, we extend the work of Soffer-Aranov and Behajaina on counting problems related to orthogonality in Kn\mathcal{K}^n. For example, we resolve an open question posed in Soffer-Aranov and Behajaina by bounding the size of the largest ``orthogonal sets'' in Kn\mathcal{K}^n. Furthermore, using similar ideas and techniques, we investigate analogues of Hadamard matrices over K\mathcal{K}. Finally, we also use ultrametric orthogonality to compute the number of sublattices of Fq[x]n\mathbb{F}_q[x]^n with a certain geometric structure, and to determine the number of orthogonal bases of a sublattice in Kn\mathcal{K}^n. The resulting formulas depend crucially on successive minima.

Keywords

Cite

@article{arxiv.2411.19406,
  title  = {Counting Problems for Orthogonal Sets and Sublattices in Function Fields},
  author = {Noy Soffer Aranov and Angelot Behajaina},
  journal= {arXiv preprint arXiv:2411.19406},
  year   = {2026}
}

Comments

to appear in Mathematika

R2 v1 2026-06-28T20:16:20.461Z