The Tate-Shafarevich groups of multinorm-one tori

Abstract

Let k be a global field and L be a finite dimensional \'etale algebra over k. In this paper, we assume that L is a product of cyclic extensions of k. Let TL/k be the multinorm-one torus defined by the multinorm equation: NL/k (t) = 1. Let Xc be the variety defined by the equation NL/k (t) = c, for some c in k*. In this paper, we compute the Tate-Shafarevich group and the algebraic Tate-Shafarevich group of the character group of TL/k. These groups measure the obstruction to the local-global principle for existence of rational points of Xc and the obstruction to the weak appraximation.