George Szeto¹ and Linjun Ma²

Copyright © 1991 George Szeto and Linjun Ma. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let A be a ring with 1, C the center of A and G′ an inner automorphism group of A induced by {Uα in ​A/α in a finite group G whose order is invertible}. Let AG′ be the fixed subring of A under the action of G′.If A is a Galcis extension of AG′ with Galois group G′ and C is the center of the subring ∑αAG′Uα then A=∑αAG′Uα and the center of AG′ is also C. Moreover, if ∑αAG′Uα is Azumaya over C, then A is a projective group ring.