Fourier-Mukai transforms of slope stable torsion-free sheaves on Weierstrass elliptic surfaces

Abstract

On a Weierstra elliptic surface X, we define a `limit' of Bridgeland stability conditions, denoted Zl-stability, by varying the polarisation in the definition of Bridgeland stability along a curve in the ample cone of X. We show that a slope stable torsion-free sheaf of positive (twisted) degree or a slope stable locally free sheaf is taken by a Fourier-Mukai transform on Db(X) to a Zl-stable object, while a Zl-semistable object of nonzero fiber degree can be modified so that its inverse Fourier-Mukai transform is a slope semistable torsion-free sheaf.