# On varieties defined by large sets of quadrics and their application to   error-correcting codes

**Authors:** Simeon Ball, Valentina Pepe

arXiv: 1904.12797 · 2020-03-20

## TL;DR

This paper studies special sets of quadratic forms in projective space, their geometric properties, and their application to constructing near-optimal error-correcting codes, extending classical theorems with new algebraic insights.

## Contribution

It introduces a new class of quadratic form subspaces with group symmetry, constructs associated error-correcting codes, and conjectures a strengthened geometric property generalizing Fano's theorem.

## Key findings

- The constructed codes are MDS or almost MDS.
- Examples include rational curves, elliptic curves, and Glynn's arc.
- A conjecture relates projections of these sets to intersections of two quadrics.

## Abstract

Let $U$ be a $({ k-1 \choose 2}-1)$-dimensional subspace of quadratic forms defined on $\mathrm{PG}(k-1,{\mathbb F})$ with the property that $U$ does not contain any reducible quadratic form. Let $V(U)$ be the points of $\mathrm{PG}(k-1,{\mathbb F})$ which are zeros of all quadratic forms in $U$. We will prove that if there is a group $G$ which fixes $U$ and no line of $\mathrm{PG}(k-1,{\mathbb F})$ and $V(U)$ spans $\mathrm{PG}(k-1,{\mathbb F})$ then any hyperplane of $\mathrm{PG}(k-1,{\mathbb F})$ is incident with at most $k$ points of $V(U)$. If ${\mathbb F}$ is a finite field then the linear code generated by the matrix whose columns are the points of $V(U)$ is a $k$-dimensional linear code of length $|V(U)|$ and minimum distance at least $|V(U)|-k$. A linear code with these parameters is an MDS code or an almost MDS code. We will construct examples of such subspaces $U$ and groups $G$, which include the normal rational curve, the elliptic curve, Glynn's arc from \cite{Glynn1986} and other examples found by computer search. We conjecture that the projection of $V(U)$ from any $k-4$ points is contained in the intersection of two quadrics, the common zeros of two linearly independent quadratic forms. This would be a strengthening of a classical theorem of Fano, which itself is an extension of a theorem of Castelnuovo, for which we include a proof using only linear algebra.

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## References

11 references — full list in the complete paper: https://tomesphere.com/paper/1904.12797/full.md

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Source: https://tomesphere.com/paper/1904.12797