Algebraic tori revisited
Abstract
Let be a finite Galois extension and . An algebraic torus defined over is called a -torus if for some integer . The set of all algebraic -tori defined over under the stably isomorphism form a semigroup, denoted by . We will give a complete proof of the following theorem due to Endo and Miyata \cite{EM5}. Theorem. Let be a finite group. Then where is a maximal -order in containing and is the locally free class group of , provided that is isomorphic to the following four types of groups : ( is any positive integer), ( is any odd integer ), ( is any odd integer , is an odd prime number not dividing , , and for any prime divisor of ), ( is any odd integer , for any prime divisor of ).
Keywords
Cite
@article{arxiv.1406.0949,
title = {Algebraic tori revisited},
author = {Ming-Chang Kang},
journal= {arXiv preprint arXiv:1406.0949},
year = {2015}
}
Comments
To appear in Asian J. Math. ; the title is changed