Simple (abstract algebra)
In mathematics, the term simple is used to describe an algebraic structure which in some sense cannot be divided by a smaller structure of the same type. Put another way, an algebraic structure is simple if the kernel of every homomorphism is either the whole structure or a single element. Some examples are:
- A group is called a simple group if it does not contain a nontrivial proper normal subgroup.
- A ring is called a simple ring if it does not contain a nontrivial two sided ideal.
- A module is called a simple module if it does not contain a nontrivial submodule.
- An algebra is called a simple algebra if it does not contain a nontrivial two sided ideal.
The general pattern is that the structure admits no non-trivial congruence relations.
The term is used differently in semigroup theory. A semigroup is said to be simple if it has no nontrivial ideals, or equivalently, if Green's relation J is the universal relation. Not every congruence on a semigroup is associated with an ideal, so a simple semigroup may have nontrivial congruences. A semigroup with no nontrivial congruences is called congruence simple.
See also[edit]
If an internal link incorrectly led you here, you may wish to change the link to point directly to the intended article.