# Arcs and tensors

**Authors:** Simeon Ball, Michel Lavrauw

arXiv: 1904.12800 · 2019-05-29

## TL;DR

This paper generalizes a geometric property of planar arcs to higher-dimensional projective spaces, associating tensors and polynomials to arcs and exploring their tangent hypersurfaces.

## Contribution

It introduces a tensor construction for arcs in projective spaces and proves a new polynomial existence result generalizing previous planar arc results.

## Key findings

- Existence of a polynomial defining tangent hypersurfaces for arcs not in degree-t hypersurfaces.
- Tensor association with arcs in PG(k-1,q) generalizes planar arc properties.
- A new proof of the Segre-Blokhuis-Bruen-Thas hypersurface for arcs of hyperplanes.

## Abstract

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

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1904.12800/full.md

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Source: https://tomesphere.com/paper/1904.12800