Conjectures on L-functions for varieties over function fields and their relations
Apparaît dans la collection : A Conference in Arithmetic Algebraic Geometry in Memory of Jan Nekovář
(Joint work with T. Keller (Groningen) and Y. Qin (Berkeley)) We consider versions for smooth varieties X over finitely generated fields K in positive characteristic p of several conjectures that can be traced back to Tate, and study their interdependence. In particular, let A=K be an abelian variety. Assuming resolutions of singularities in positive characteristic, I will explain how to relate the BSD-rank conjecture for A to the finiteness of the p-primary part of the Tate-Shafarevich group of A using rigid cohomology. Furthermore, I will discuss what is needed for a generalisation.