Bridgeland stability conditions and the tangent bundle of surfaces of general type
Abstract: Let $X$ be a smooth compact complex surface with the canonical divisor $K_X$ ample and let $\Theta_X$ be its holomorphic tangent bundle. Bridgeland stability conditions are used to study the space $H1 (\Theta_X)$ of infinitesimal deformations of complex structures of $X$ and its relation to the geometry/topology of $X$. The main observation is that for $X$ with $H1 (\Theta_X)$ nonzero and the Chern numbers $(c_2 (X), K2_X)$ subject to $$ \tau_X :=2ch_2 (\Theta_X)=K2_X -2c_2(X) >0 $$ the object $\Theta_X [1]$ of the derived category of bounded complexes of coherent sheaves on $X$ is Bridgeland unstable in a certain part of the space of Bridgeland stability conditions. The Harder-Narasimhan filtrations of $\Theta_X [1]$ for those stability conditions are expected to provide new insights into geometry of surfaces of general type and the study of their moduli. The paper provides a certain body of evidence that this is indeed the case.
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