Fourier-Mukai Transforms and Stable Sheaves on Weierstrass Elliptic Surfaces

Wanmin Liu; Jason Lo; Cristian Martinez

doi:10.1007/s00574-024-00422-7

Fourier-Mukai Transforms and Stable Sheaves on Weierstrass Elliptic Surfaces

Wanmin Liu, Jason Lo, Cristian Martinez

School of Engineering, Science and Technology

Research output: Contribution to journal › Article › peer-review

Abstract

On a Weierstraß elliptic surface X, we define a “limit” of Bridgeland stability conditions, denoted as Z^l-stability, by moving the polarisation towards the fiber direction in the ample cone while keeping the volume of the polarisation fixed. We describe conditions under which a slope stable torsion-free sheaf is taken by a Fourier-Mukai transform to a Z^l-stable object, and describe a modification upon which a Z^l-semistable object is taken by the inverse Fourier-Mukai transform to a slope semistable torsion-free sheaf. We also study wall-crossing for Bridgeland stability, and show that 1-dimensional twisted Gieseker semistable sheaves are taken by a Fourier-Mukai transform to Bridgeland semistable objects.

Original language	English
Article number	47
Journal	Bulletin of the Brazilian Mathematical Society
Volume	55
Issue number	4
DOIs	https://doi.org/10.1007/s00574-024-00422-7
Publication status	Published - Dec 2024

Bibliographical note

Publisher Copyright:
© The Author(s), under exclusive licence to Brazilian Mathematical Society 2024.

ASJC Scopus Subject Areas

General Mathematics

Keywords

14J60
Elliptic surface
Fourier-Mukai transform
Primary 14J27
Secondary: 14J33
Stability
Weierstrass surface

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10.1007/s00574-024-00422-7

Cite this

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title = "Fourier-Mukai Transforms and Stable Sheaves on Weierstrass Elliptic Surfaces",

abstract = "On a Weierstra{\ss} elliptic surface X, we define a “limit” of Bridgeland stability conditions, denoted as Zl-stability, by moving the polarisation towards the fiber direction in the ample cone while keeping the volume of the polarisation fixed. We describe conditions under which a slope stable torsion-free sheaf is taken by a Fourier-Mukai transform to a Zl-stable object, and describe a modification upon which a Zl-semistable object is taken by the inverse Fourier-Mukai transform to a slope semistable torsion-free sheaf. We also study wall-crossing for Bridgeland stability, and show that 1-dimensional twisted Gieseker semistable sheaves are taken by a Fourier-Mukai transform to Bridgeland semistable objects.",

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AU - Liu, Wanmin

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AU - Martinez, Cristian

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PY - 2024/12

Y1 - 2024/12

N2 - On a Weierstraß elliptic surface X, we define a “limit” of Bridgeland stability conditions, denoted as Zl-stability, by moving the polarisation towards the fiber direction in the ample cone while keeping the volume of the polarisation fixed. We describe conditions under which a slope stable torsion-free sheaf is taken by a Fourier-Mukai transform to a Zl-stable object, and describe a modification upon which a Zl-semistable object is taken by the inverse Fourier-Mukai transform to a slope semistable torsion-free sheaf. We also study wall-crossing for Bridgeland stability, and show that 1-dimensional twisted Gieseker semistable sheaves are taken by a Fourier-Mukai transform to Bridgeland semistable objects.

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KW - Secondary: 14J33

KW - Stability

KW - Weierstrass surface

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Fourier-Mukai Transforms and Stable Sheaves on Weierstrass Elliptic Surfaces

Abstract

Bibliographical note

ASJC Scopus Subject Areas

Keywords

Access to Document

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