Algebraic tori revisited

Abstract

Let K/k be a finite Galois extension and π = Gal(K/k). An algebraic torus T defined over k is called a π-torus if T×Spec(k) Spec(K) Gm,Kn for some integer n. The set of all algebraic π-tori defined over k under the stably isomorphism form a semigroup, denoted by T(π). We will give a complete proof of the following theorem due to Endo and Miyata EM5. Theorem. Let π be a finite group. Then T(π) C(Zπ) where Zπ is a maximal Z-order in Qπ containing Zπ and C(Zπ) is the locally free class group of Zπ, provided that π is isomorphic to the following four types of groups : Cn (n is any positive integer), Dm (m is any odd integer 3), Cqf× Dm (m is any odd integer 3, q is an odd prime number not dividing m, f 1, and (Z/qfZ)×= p for any prime divisor p of m), Q4m (m is any odd integer 3, p 3 4 for any prime divisor p of m).