English

Small complete caps from nodal cubics

Combinatorics 2013-05-15 v1

Abstract

Bicovering arcs in Galois affine planes of odd order are a powerful tool for constructing complete caps in spaces of higher dimensions. In this paper we investigate whether some arcs contained in nodal cubic curves are bicovering. For m1m_1, m2m_2 coprime divisors of q1q-1, bicovering arcs in AG(2,q)AG(2,q) of size k(q1)m1+m2m1m2k\le (q-1)\frac{m_1+m_2}{m_1m_2} are obtained, provided that (m1m2,6)=1(m_1m_2,6)=1 and m1m2<q4/3.5m_1m_2<\sqrt[4]{q}/3.5. Such arcs produce complete caps of size kq(N2)/2kq^{(N-2)/2} in affine spaces of dimension N0(mod4)N\equiv 0 \pmod 4. For infinitely many qq's these caps are the smallest known complete caps in AG(N,q)AG(N,q), N0(mod4)N \equiv 0 \pmod 4.

Keywords

Cite

@article{arxiv.1305.3019,
  title  = {Small complete caps from nodal cubics},
  author = {Nurdagul Anbar and Daniele Bartoli and Massimo Giulietti and Irene Platoni},
  journal= {arXiv preprint arXiv:1305.3019},
  year   = {2013}
}
R2 v1 2026-06-22T00:16:01.249Z