Rings with radical maximal submodules

For dynamical systems with coe cient in a ring it is not always possible to compute by a ÿnite procedure the maximal (A; B)-invariant submodule contained in the kernel of the output map C, namely V \* (Ker C). This di culty prevents one from checking necessary and su cient geometric conditions for t

A ring with identity is said to be a local ring if it contains a unique maximal right ideal [2; 751. This implies that the unique maximal right ideal is also the unique maximal ideal. But rings with unique maximal ideals need not be local rings. The ring of all 2x2 matrices over the ring of integers

An associative ring R without unity is called radical if it coincides with its Jacobson radical, which means that the set of all elements of R forms a group denoted by R ( under the circle operation r ( s s r q s q rs on R. It is proved that, for a radical ring R, the group R ( satisfies an n-Engel