TY - JOUR
T1 - Fourier-Mukai Transforms and Stable Sheaves on Weierstrass Elliptic Surfaces
AU - Liu, Wanmin
AU - Lo, Jason
AU - Martinez, Cristian
N1 - Publisher Copyright:
© The Author(s), under exclusive licence to Brazilian Mathematical Society 2024.
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.
AB - 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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U2 - 10.1007/s00574-024-00422-7
DO - 10.1007/s00574-024-00422-7
M3 - Research Article
AN - SCOPUS:85209552899
SN - 1678-7544
VL - 55
JO - Bulletin of the Brazilian Mathematical Society
JF - Bulletin of the Brazilian Mathematical Society
IS - 4
M1 - 47
ER -