A Generalization of UQ Rings

Abstract

We examine the newly defined class of n-UQ rings described by the condition that un - 1 ∈ QN(R) for every unit u ∈ U(R), where QN(R) denotes the set of quasi-nilpotent elements (see Tien). This class naturally extends the recently defined class of rings in daoa and dam, as well as expectedly generalizes previously explored concepts such as UJ, UU and UQ rings. We conduct here a comprehensive structural analysis of these n-UQ rings and study their stability under various ring-theoretic constructions including matrix rings, group rings, trivial extensions and power series rings. As a result, several new characterizations are established, thus revealing relevant connections between n-UQ rings and fundamental classes of rings such as reduced, clean, exchange, semi-regular and potent rings, respectively. Moreover, we prove that the classes of n-UJ and n-UU rings are properly contained in the class of n-UQ rings. These achievements not only unify and expand existing theories in this branch, but also provide a robust framework for possible further investigations into the interplay between the unit behavior and quasi-nilpotency in noncommutative ring theory.