On the Structure of the Generalized Group of Units

Abstract

Let R be a finite commutative ring with identity and U(R) be its group of units. In 2005, El-Kassar and Chehade presented a ring structure for U(R) and as a consequence they generalized this group of units to the generalized group of units Uk( R) defined iteratively as the group of the units of Uk-1(R), with U1( R) =U(R) . In this paper, we examine the structure of this group, when R=Zn. We find a decomposition of Uk(Zn) as a direct product of cyclic groups for the general case of any k, and we study when these groups are boolean and trivial. We also show that this decomposition structure is directly related to the Pratt Tree primes.