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In abstract algebra, a simple ring is a non-zero ring that has no two-sided ideal besides the zero ideal and itself.

One should notice that several references (e.g., Lang (2002) or Bourbaki (2012)) require in addition that a simple ring be left or right Artinian (or equivalently semi-simple). Under such terminology a non-zero ring with no non-trivial two-sided ideals is called quasi-simple.

A simple ring can always be considered as a simple algebra. Rings which are simple as rings but not as modules do exist: the full matrix ring over a field does not have any nontrivial ideals (since any ideal of M(n,R) is of the form M(n,I) with I an ideal of R), but has nontrivial left ideals (namely, the sets of matrices which have some fixed zero columns).

According to the Artin–Wedderburn theorem, every simple ring that is left or right Artinian is a matrix ring over a division ring. In particular, the only simple rings that are a finite-dimensional vector space over the real numbers are rings of matrices over either the real numbers, the complex numbers, or the quaternions.

Any quotient of a ring by a maximal ideal is a simple ring. In particular, a field is a simple ring. In fact a division ring is also a simple ring. A ring is simple if and only its opposite ring R^o is simple.

An example of a simple ring that is not a matrix ring over a division ring is the Weyl algebra.

Furthermore, a ring Rdisplaystyle R is a simple commutative ring if and only if Rdisplaystyle R is a field. This is because if Rdisplaystyle R is a commutative ring, then you can pick a nonzero element x∈Rdisplaystyle xin R and consider the ideal xr:r∈Rdisplaystyle xr:rin R. Then since Rdisplaystyle R is simple, this ideal is the entire ring, and so it contains 1, and therefore there is some element y∈Rdisplaystyle yin R such that xy=1displaystyle xy=1, and so Rdisplaystyle R is a field. Conversely, if Rdisplaystyle R is known to be a field, then any nonzero ideal I⊂Rdisplaystyle Isubset R will have a nonzero element i∈Idisplaystyle iin I. But since Rdisplaystyle R is a field, then i−1∈Rdisplaystyle i^-1in R and so i−1i=1∈Idisplaystyle i^-1i=1in I, and so I=Rdisplaystyle I=R.

Wedderburn's theorem

Wedderburn's theorem characterizes simple rings with a unit and a minimal left ideal. (The left Artinian condition is a generalization of the second assumption.) Namely it says that every such ring is, up to isomorphism, a ring of (n × n)-matrices over a division ring.

Let D be a division ring and M(n, D) be the ring of matrices with entries in D. It is not hard to show that every left ideal in M(n, D) takes the following form:

The n₁...n_k-th columns of M have zero entries,

for some fixed n₁, ..., n_k ⊂ 1, ..., n. So a minimal ideal in M(n, D) is of the form

M ∈ M(n, D) ,

for a given k. In other words, if I is a minimal left ideal, then I = (M(n, D))e, where e is the idempotent matrix with 1 in the (k, k) entry and zero elsewhere. Also, D is isomorphic to e(M(n, D))e. The left ideal I can be viewed as a right-module over e(M(n, D))e, and the ring M(n, D) is clearly isomorphic to the algebra of homomorphisms on this module.

The above example suggests the following lemma:

Lemma. A is a ring with identity 1 and an idempotent element e where AeA = A. Let I be the left ideal Ae, considered as a right module over eAe. Then A is isomorphic to the algebra of homomorphisms on I, denoted by Hom(I).

Proof: We define the "left regular representation" Φ : A → Hom(I) by Φ(a)m = am for m ∈ I. Φ is injective because if a ⋅ I = aAe = 0, then aA = aAeA = 0, which implies that a = a ⋅ 1 = 0.

For surjectivity, let T ∈ Hom(I). Since AeA = A, the unit 1 can be expressed as 1 = ∑a_ieb_i. So

T(m) = T(1⋅m) = T(∑a_ieb_im) = ∑ T(a_ieeb_im) = ∑ T(a_ie) eb_im = [∑T(a_ie)eb_i]m.

Since the expression [∑T(a_ie)eb_i] does not depend on m, Φ is surjective. This proves the lemma.

Wedderburn's theorem follows readily from the lemma.

Theorem (Wedderburn). If A is a simple ring with unit 1 and a minimal left ideal I, then A is isomorphic to the ring of n × n-matrices over a division ring.

One simply has to verify the assumptions of the lemma hold, i.e. find an idempotent e such that I = Ae, and then show that eAe is a division ring. The assumption A = AeA follows from A being simple.

See also

• simple (algebra)

References

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  Bourbaki, Nicolas (2012), Algèbre Ch. 8 (2nd ed.), Berlin, New York: Springer-Verlag, ISBN 978-3-540-35315-7.mw-parser-output cite.citationfont-style:inherit.mw-parser-output qquotes:"""""""'""'".mw-parser-output code.cs1-codecolor:inherit;background:inherit;border:inherit;padding:inherit.mw-parser-output .cs1-lock-free abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/6/65/Lock-green.svg/9px-Lock-green.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-lock-limited a,.mw-parser-output .cs1-lock-registration abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/d/d6/Lock-gray-alt-2.svg/9px-Lock-gray-alt-2.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-lock-subscription abackground:url("//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Lock-red-alt-2.svg/9px-Lock-red-alt-2.svg.png")no-repeat;background-position:right .1em center.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registrationcolor:#555.mw-parser-output .cs1-subscription span,.mw-parser-output .cs1-registration spanborder-bottom:1px dotted;cursor:help.mw-parser-output .cs1-hidden-errordisplay:none;font-size:100%.mw-parser-output .cs1-visible-errorfont-size:100%.mw-parser-output .cs1-subscription,.mw-parser-output .cs1-registration,.mw-parser-output .cs1-formatfont-size:95%.mw-parser-output .cs1-kern-left,.mw-parser-output .cs1-kern-wl-leftpadding-left:0.2em.mw-parser-output .cs1-kern-right,.mw-parser-output .cs1-kern-wl-rightpadding-right:0.2em
  


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  Henderson, D.W. (1965). "A short proof of Wedderburn's theorem". Amer. Math. Monthly. 72: 385–386. doi:10.2307/2313499.
  


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  Lam, Tsit-Yuen (2001), A First Course in Noncommutative Rings (2nd ed.), Berlin, New York: Springer-Verlag, doi:10.1007/978-1-4419-8616-0, ISBN 978-0-387-95325-0, MR 1838439
  


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  Lang, Serge (2002), Algebra (3rd ed.), Berlin, New York: Springer-Verlag, ISBN 978-0387953854