On the Severi type inequalities for irregular surfaces

Abstract

Let X be a minimal surface of general type and maximal Albanese dimension with irregularity q≥ 2. We show that KX2≥ 4( OX)+4(q-2) if KX2<92( OX), and also obtain the characterization of the equality. As a consequence, we prove a conjecture of Manetti on the geography of irregular surfaces if KX2≥ 36(q-2) or ( OX)≥ 8(q-2), and we also prove a conjecture that surfaces of general type and maximal Albanese dimension with KX2=4( OX) are exactly the resolution of double covers of abelian surfaces branched over ample divisors with at worst simple singularities.