The finiteness of the Tate-Shafarevich group over function fields for algebraic tori defined over the base field

Abstract

Let K be a field and V be a set of rank one valuations of K. The corresponding Tate-Shafarevich group of a K-torus T is Sha(T , V) = (H1(K , T) Πv ∈ V H1(Kv , T)). We prove that if K = k(X) is the function field of a smooth geometrically integral quasi-projective variety over a field k of characteristic 0 and V is the set of discrete valuations of K associated with prime divisors on X, then for any torus T defined over the base field k, the group Sha(T , V) is finite in the following situations: (1) k is finitely generated and X(k) ≠ ; (2) k is a number field.