On hyperquadrics containing projective varieties

TL;DR

This paper extends classical results on the quadratic equations defining projective varieties, classifying those with nearly minimal quadratic equations and analyzing their geometric properties, especially for varieties of degree at least 2c+1.

Contribution

It completes the classification of varieties with at least {{c+1} race {2}} - 3 quadratic equations and explores the structure of their zero sets.

Findings

Classifies varieties with at least {{c+1} race {2}} - 3 quadratic equations.

Analyzes the zero set of these quadratic equations.

Applies results to varieties of degree ≥ 2c+1.

Abstract

Classical Castelnuovo Lemma shows that the number of linearly independent quadratic equations of a nondegenerate irreducible projective variety of codimension $c$ is at most ${{c+1} \choose {2}}$ and the equality is attained if and only if the variety is of minimal degree. Also G. Fano's generalization of Castelnuovo Lemma implies that the next case occurs if and only if the variety is a del Pezzo variety. Recently, these results are extended to the next case. This paper is intended to complete the classification of varieties satisfying at least ${{c+1} \choose {2}}-3$ linearly independent quadratic equations. Also we investigate the zero set of those quadratic equations and apply our results to projective varieties of degree $\geq 2c+1$.