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Partial Difference Sets with Denniston Parameters in Elementary Abelian $p$-Groups

Combinatorics 2024-07-23 v1

Abstract

Denniston \cite{D1969} constructed partial difference sets (PDS) with parameters (23m,(2m+r2m+2r)(2m1),2m2r+(2m+r2m+2r)(2r2),(2m+r2m+2r)(2r1))(2^{3m}, (2^{m+r}-2^m+2^r)(2^m-1), 2^m-2^r+(2^{m+r}-2^m+2^r)(2^r-2), (2^{m+r}-2^m+2^r)(2^r-1)) in elementary abelian groups of order 23m2^{3m} for all m2m\geq 2 and 1r<m1 \leq r < m. These PDS correspond to maximal arcs in the Desarguesian projective planes PG(2,2m)(2, 2^m). Davis et al. \cite{DHJP2024} and also De Winter \cite{dewinter23} presented constructions of PDS with Denniston parameters (p3m,(pm+rpm+pr)(pm1),pmpr+(pm+rpm+pr)(pr2),(pm+rpm+pr)(pr1))(p^{3m}, (p^{m+r}-p^m+p^r)(p^m-1), p^m-p^r+(p^{m+r}-p^m+p^r)(p^r-2), (p^{m+r}-p^m+p^r)(p^r-1)) in elementary abelian groups of order p3mp^{3m} for all m2m \geq 2 and r{1,m1}r \in \{1, m-1\}, where pp is an odd prime. The constructions in \cite{DHJP2024, dewinter23} are particularly intriguing, as it was shown by Ball, Blokhuis, and Mazzocca \cite{BBM1997} that no nontrivial maximal arcs in PG(2,qm)(2, q^m) exist for any odd prime power qq. In this paper, we show that PDS with Denniston parameters (q3m,(qm+rqm+qr)(qm1),qmqr+(qm+rqm+qr)(qr2),(qm+rqm+qr)(qr1))(q^{3m}, (q^{m+r}-q^m+q^r)(q^m-1), q^m-q^r+(q^{m+r}-q^m+q^r)(q^r-2), (q^{m+r}-q^m+q^r)(q^r-1)) exist in elementary abelian groups of order q3mq^{3m} for all m2m \geq 2 and 1r<m1 \leq r < m, where qq is an arbitrary prime power.

Keywords

Cite

@article{arxiv.2407.15632,
  title  = {Partial Difference Sets with Denniston Parameters in Elementary Abelian $p$-Groups},
  author = {Jingjun Bao and Qing Xiang and Meng Zhao},
  journal= {arXiv preprint arXiv:2407.15632},
  year   = {2024}
}

Comments

11 pages

R2 v1 2026-06-28T17:49:30.550Z