On the slope and geography of fibred surfaces and threefolds
- Barja Yáñez, Miguel Ángel
- Juan Carlos Naranjo del Val Director
Defence university: Universitat de Barcelona
Year of defence: 1998
- Juan Carlos Welters Dyadalewice Chair
- José Ignacio Burgos Gil Secretary
- Fabrizio Catanese Committee member
- Daniel Hernández Ruipérez Committee member
- Pere Pascual Gainza Committee member
Type: Thesis
Abstract
In this tesis we study numerical propieties of surfaces and threefolds, mainly fibred over curves, the so called "slope" of the fibration. We prove partially a conjecture of Fujita on the semiampleness of the direct image of the relative dualizing sheaf of a fibration. We give new lower bounds of the slope of a fibred surface depending on data of the general fibre (existence of involutions) and on data of the hole surface (the fibration not being the Albanese morphism, for example). We study the case of threefolds over curves. We prove that, in general, the relative algebraic Euler characteristic is nonnegative and give lower bound for the slope. We classify the lowest cases of the invariants.