# Non-reduced moduli spaces of sheaves on multiple curves

**Authors:** J.-M. Dr\'ezet

arXiv: 1705.10634 · 2017-05-31

## TL;DR

This paper investigates non-reduced structures in moduli spaces of sheaves on ribbons and their deformations to reduced curves, revealing how certain moduli components can split or limit to multiple components.

## Contribution

It demonstrates the existence of non-reduced moduli spaces of sheaves on ribbons and describes their deformation behavior to reduced curves, highlighting the structure of these degenerations.

## Key findings

- Moduli spaces of stable sheaves on ribbons can be non reduced.
- Certain sheaves deform uniquely to sheaves on reduced curves.
- Components of moduli spaces can split into multiple components under deformation.

## Abstract

Some coherent sheaves on projective varieties have a non reduced versal deformation space. For example, this is the case for most unstable rank 2 vector bundles on ${\mathbb P}_2$. In particular, it may happen that some moduli spaces of stable sheaves are non reduced.   We consider the case of some sheaves on ribbons (double structures on smooth projective curves): the quasi locally free sheaves of rigid type. Le $E$ be such a sheaf.   -- Let ${\mathcal E}$ be a flat family of sheaves containing $E$. We find that it is a reduced deformation of $E$ when some canonical family associated to ${\mathcal E}$ is also flat.   -- We consider a deformation of the ribbon to reduced projective curves with two components, and find that $E$ can be deformed in two distinct ways to sheaves on the reduced curves. In particular some components $\bf M$ of the moduli spaces of stable sheaves deform to two components of the moduli spaces of sheaves on the reduced curves, and $\bf M$ appears as the "limit" of varieties with two components, whence the non reduced structure of $\bf M$.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1705.10634/full.md

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Source: https://tomesphere.com/paper/1705.10634