English

Arcs and tensors

Combinatorics 2019-05-29 v2

Abstract

To an arc A\mathcal{A} of PG(k1,q)\mathrm{PG}(k-1,q) of size q+k1tq+k-1-t we associate a tensor in νk,t(A)k1\langle \nu_{k,t}(\mathcal{A})\rangle^{\otimes k-1}, where νk,t\nu_{k,t} denotes the Veronese map of degree tt defined on PG(k1,q)\mathrm{PG}(k-1,q). As a corollary we prove that for each arc A\mathcal{A} in PG(k1,q)\mathrm{PG}(k-1,q) of size q+k1tq+k-1-t, which is not contained in a hypersurface of degree tt, there exists a polynomial F(Y1,,Yk1)F(Y_1,\ldots,Y_{k-1}) (in k(k1)k(k-1) variables) where Yj=(Xj1,,Xjk)Y_j=(X_{j1},\ldots,X_{jk}), which is homogeneous of degree tt in each of the kk-tuples of variables YjY_j, which upon evaluation at any (k2)(k-2)-subset SS of the arc A\mathcal{A} gives a form of degree tt on PG(k1,q)\mathrm{PG}(k-1,q) whose zero locus is the tangent hypersurface of A\mathcal{A} at SS, i.e. the union of the tangent hyperplanes of A\mathcal{A} at SS. This generalises the equivalent result for planar arcs (k=3k=3), proven in \cite{BaLa2018}, to arcs in projective spaces of arbitrary dimension. A slightly weaker result is obtained for arcs in PG(k1,q)\mathrm{PG}(k-1,q) of size q+k1tq+k-1-t which are contained in a hypersurface of degree tt. We also include a new proof of the Segre-Blokhuis-Bruen-Thas hypersurface associated to an arc of hyperplanes in PG(k1,q)\mathrm{PG}(k-1,q).

Keywords

Cite

@article{arxiv.1904.12800,
  title  = {Arcs and tensors},
  author = {Simeon Ball and Michel Lavrauw},
  journal= {arXiv preprint arXiv:1904.12800},
  year   = {2019}
}
R2 v1 2026-06-23T08:52:30.495Z