Finite unitary ring with minimal non-nilpotent group of units

Abstract

Let R be a finite unitary ring such that R=R0[R*] where R0 is the prime ring and R* is not a nilpotent group. We show that if all proper subgroups of R* are nilpotent groups, then the cardinal of R is a power of prime number 2. In addition, if (R/Jac(R))* is not a p-group, then either R M2(GF(2)) or R M2(GF(2)) A where M2(GF(2)) is the ring of 2× 2 matrices over the finite field GF(2) and A is a direct sum of finite field GF(2).