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 m1, m2 coprime divisors of q−1, bicovering arcs in AG(2,q) of size k≤(q−1)m1m2m1+m2 are obtained, provided that (m1m2,6)=1 and m1m2<4q/3.5. Such arcs produce complete caps of size kq(N−2)/2 in affine spaces of dimension N≡0(mod4). For infinitely many q's these caps are the smallest known complete caps in AG(N,q), N≡0(mod4).
@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}
}