Stably finite ring
In mathematics, particularly in abstract algebra, a ring R is said to be stably finite if, for all square matrices A, B of the same size over R, AB = 1 implies BA = 1. This is a stronger property for a ring than its having the invariant basis number property. Namely, any nontrivial stably finite ring has IBN. Commutative rings, noetherian rings and artinian rings are stably finite. A subring of a stably finite ring and a matrix ring over a stably finite ring is stably finite. A ring satisfying Klein's nilpotence condition is stably finite.
