$\mathrm{ EA}(q)$-additive Steiner 2-designs
Combinatorics
2025-11-04 v1
Abstract
A design is -additive with an abelian group, if its points are in and each block is zero-sum in . All the few known ``manageable" additive Steiner 2-designs are -additive for a suitable , where is the elementary abelian group of order . We present some general constructions for -additive Steiner 2-designs which unify the known ones and allow to find a few new ones: an additive -additive 2- design which is also resolvable, and three pairwise non-isomorphic -additive 2- designs, none of which is the point-line design of . In the attempt to find also an -additive 2- design, we prove that a putative 2-analog of a 2- 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}
}