On the Infinitesimal Torelli theorem for regular surfaces with very ample canonical divisor

Abstract

Let X be a smooth compact complex surface subject to the following conditions: (i) the canonical line bundle OX(KX) is very ample, (ii) the irregularity q(X): = h1(OX) =0, (iii) X contains no rational normal curves of degree ≤ (pg-1), (iv) the multiplication map m2: Sym2(H0(OX(KX))) H0 (OX (2KX)) is surjective. It is shown that the Infinitesimal Torelli holds for such X. Our proof is based on the study of the cup-product H1 (X) (OX(KX)) H1 (X) where X (resp. X) is the holomorphic tangent (resp. cotangent) bundle of X. Conceptually, the approach consists of lifting the data of the cohomological cup-product above to the category of complexes of coherent sheaves of X. This establishes connections between the geometry of the canonical map and the above cup-product by exhibiting geometrically meaningful objects in the category of (short) exact complexes of coherent sheaves on X.