Twisted Kodaira-Spencer classes and the geometry of surfaces of general type

Abstract

We study the cohomology groups H1(X,X(-mKX)), for m≥1, where X is a smooth minimal complex surface of general type, X its holomorphic tangent bundle, and KX its canonical divisor. One of the main results is a precise vanishing criterion for H1(X,X (-KX)). The proof is based on the geometric interpretation of non-zero cohomology classes of H1(X,X (-KX)). This interpretation in turn uses higher rank vector bundles on X. We apply our methods to the long standing conjecture saying that the irregularity of surfaces in 4 is at most 2. We show that if X has prescribed Chern numbers, no irrational pencil, and is embedded in 4 with a sufficiently large degree, then the irregularity of X is at most 3.