English

$\mathrm{ EA}(q)$-additive Steiner 2-designs

Combinatorics 2025-11-04 v1

Abstract

A design is GG-additive with GG an abelian group, if its points are in GG and each block is zero-sum in GG. All the few known ``manageable" additive Steiner 2-designs are EA(q)\mathrm{EA}(q)-additive for a suitable qq, where EA(q)\mathrm{EA}(q) is the elementary abelian group of order qq. We present some general constructions for EA(q)\mathrm{EA}(q)-additive Steiner 2-designs which unify the known ones and allow to find a few new ones: an additive EA(28)\mathrm{EA}(2^8)-additive 2-(52,4,1)(52,4,1) design which is also resolvable, and three pairwise non-isomorphic EA(35)\mathrm{EA}(3^5)-additive 2-(121,4,1)(121,4,1) designs, none of which is the point-line design of PG(4,3)\mathrm{PG}(4,3). In the attempt to find also an EA(29)\mathrm{EA}(2^9)-additive 2-(511,7,1)(511,7,1) design, we prove that a putative 2-analog of a 2-(9,3,1)(9,3,1) design cannot be cyclic.

Keywords

Cite

@article{arxiv.2511.01073,
  title  = {$\mathrm{ EA}(q)$-additive Steiner 2-designs},
  author = {Marco Buratti and Mario Galici and Alessandro Montinaro and Anamari Nakic and Alfred Wassermann},
  journal= {arXiv preprint arXiv:2511.01073},
  year   = {2025}
}
R2 v1 2026-07-01T07:18:18.719Z