Arcs and tensors
Abstract
To an arc of of size we associate a tensor in , where denotes the Veronese map of degree defined on . As a corollary we prove that for each arc in of size , which is not contained in a hypersurface of degree , there exists a polynomial (in variables) where , which is homogeneous of degree in each of the -tuples of variables , which upon evaluation at any -subset of the arc gives a form of degree on whose zero locus is the tangent hypersurface of at , i.e. the union of the tangent hyperplanes of at . This generalises the equivalent result for planar arcs (), proven in \cite{BaLa2018}, to arcs in projective spaces of arbitrary dimension. A slightly weaker result is obtained for arcs in of size which are contained in a hypersurface of degree . We also include a new proof of the Segre-Blokhuis-Bruen-Thas hypersurface associated to an arc of hyperplanes in .
Keywords
Cite
@article{arxiv.1904.12800,
title = {Arcs and tensors},
author = {Simeon Ball and Michel Lavrauw},
journal= {arXiv preprint arXiv:1904.12800},
year = {2019}
}