# Quot schemes, Segre invariants, and inflectional loci of scrolls over   curves

**Authors:** George H. Hitching

arXiv: 1812.00706 · 2018-12-04

## TL;DR

This paper links the geometry of inflectional loci of scrolls over curves to Quot schemes of vector bundles, providing new criteria for stability and showing expected dimensions for general cases.

## Contribution

It offers a geometric characterization of the Segre invariant via Quot schemes and establishes conditions for the expected dimension of inflectional loci in general settings.

## Key findings

- Inflectional loci are described in terms of Quot schemes.
- New geometric criteria for bundle semistability are derived.
- Inflectional loci have expected dimensions in general cases.

## Abstract

Let $E$ be a vector bundle over a smooth curve $C$, and $S = \mathbb{P} E$ the associated projective bundle. We describe the inflectional loci of certain projective models $\psi \colon S \dashrightarrow \mathbb{P}^n$ in terms of Quot schemes of $E$. This gives a geometric characterisation of the Segre invariant $s_1 (E)$, which leads to new geometric criteria for semistability and cohomological stability of bundles over $C$. We also use these ideas to show that for general enough $S$ and $\psi$, the inflectional loci are all of the expected dimension. An auxiliary result, valid for a general subvariety of $\mathbb{P}^n$, is that under mild hypotheses, the inflectional loci associated to a projection from a general centre are of the expected dimension.

## Full text

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## References

28 references — full list in the complete paper: https://tomesphere.com/paper/1812.00706/full.md

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Source: https://tomesphere.com/paper/1812.00706