Editing Artinian module (section)

==Left and right Artinian rings, modules and bimodules==
The ring ''R'' can be considered as a right module, where the action is the natural one given by the ring multiplication on the right.  ''R'' is called right [[Artinian ring|Artinian]] when this right module ''R'' is an Artinian module. The definition of "left Artinian ring" is done analogously.  For [[noncommutative ring]]s this distinction is necessary, because it is possible for a ring to be Artinian on one side but not the other.

The left-right adjectives are not normally necessary for modules, because the module ''M'' is usually given as a left or right ''R''-module at the outset.  However, it is possible that ''M'' may have both a left and right ''R''-module structure, and then calling ''M'' Artinian is ambiguous, and it becomes necessary to clarify which module structure is Artinian.  To separate the properties of the two structures, one can abuse terminology and refer to ''M'' as left Artinian or right Artinian when, strictly speaking, it is correct to say that ''M'', with its left ''R''-module structure, is Artinian.

The occurrence of modules with a left and right structure is not unusual: for example ''R'' itself has a left and right ''R''-module structure.  In fact this is an example of a [[bimodule]], and it may be possible for an [[abelian group]] ''M'' to be made into a left-''R'', right-''S'' bimodule for a different ring ''S''.  Indeed, for any right module ''M'', it is automatically a left module over the ring of [[Integer#Algebraic properties|integers]] '''Z''', and moreover is a '''Z'''-''R''-bimodule.  For example, consider the [[rational number]]s '''Q''' as a '''Z'''-'''Q'''-bimodule in the natural way.  Then '''Q''' is not Artinian as a left '''Z'''-module, but it is Artinian as a right '''Q'''-module.

The Artinian condition can be defined on bimodule structures as well: an '''Artinian bimodule''' is a [[bimodule]] whose poset of sub-bimodules satisfies the descending chain condition.  Since a sub-bimodule of an ''R''-''S''-bimodule ''M'' is a fortiori a left ''R''-module, if ''M'' considered as a left ''R''-module were Artinian, then ''M'' is automatically an Artinian bimodule.  It may happen, however, that a bimodule is Artinian without its left or right structures being Artinian, as the following example will show.

''Example:''  It is well known that a [[simple ring]] is left Artinian if and only if it is right Artinian, in which case it is a [[semisimple ring]].  Let ''R'' be a simple ring which is not right Artinian.  Then it is also not left Artinian.  Considering ''R'' as an ''R''-''R''-bimodule in the natural way, its sub-bimodules are exactly the [[ideal (ring theory)|ideals]] of ''R''. Since ''R'' is simple there are only two: ''R'' and the [[zero ideal]].  Thus the bimodule ''R'' is Artinian as a bimodule, but not Artinian as a left or right ''R''-module over itself.