Abstract
The problem of invertibility of ideals in orders has been studied by a number of authors. The commutative case has been considered by Dade, Taussky, and Zassenhaus; Frolich; and Singer. Ballew gives a generalization of Frolich's results to a class of noncommutative orders. We examine some of the possible extensions of the results of Dade et al. to noncommutative orders.
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