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group representation (Definition)

Let $ G$ be a group, and let $ V$ be a vector space. A representation of $ G$ in $ V$ is a group homomorphism $ \rho\colon G \to \operatorname{GL}(V)$ from $ G$ to the general linear group $ \operatorname{GL}(V)$ of invertible linear transformations of $ V$.

Equivalently, a representation of $ G$ is a vector space $ V$ which is a $ G$-module, that is, a (left) module over the group ring $ \mathbb{Z}[G]$. The equivalence is achieved by assigning to each homomorphism $ \rho\colon G \to \operatorname{GL}(V)$ the module structure whose scalar multiplication is defined by $ g \cdot v := (\rho(g))(v)$, and extending linearly. Note that, although technically a group representation is a homomorphism such as $ \rho$, most authors invariably denote a representation using the underlying vector space $ V$, with the homomorphism being understood from context, in much the same way that vector spaces themselves are usually described as sets with the corresponding binary operations being understood from context.

Special kinds of representations

(preserving all notation from above)

A representation is faithful if either of the following equivalent conditions is satisfied:

A subrepresentation of $ V$ is a subspace $ W$ of $ V$ which is a left $ \mathbb{Z}[G]$-submodule of $ V$; such a subspace is sometimes called a $ G$-invariant subspace of $ V$. Equivalently, a subrepresentation of $ V$ is a subspace $ W$ of $ V$ with the property that

$\displaystyle (\rho(g))(w) \in W$    for all $\displaystyle g \in G$    and $\displaystyle w \in W. $

A representation $ V$ is called irreducible if it has no subrepresentations other than itself and the zero module.



"group representation" is owned by djao.
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See Also: general linear group

Other names:  representation
Also defines:  subrepresentation, irreducible, faithful

Attachments:
matrix representation (Definition) by drini
permutation representation (Definition) by drini
quotient representations (Definition) by rm50
proof that dimension of complex irreducible representation divides order of group (Proof) by whm22
irreducible representations of $S_n$ (Result) by rm50
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Cross-references: zero module, property, subspace, injective, equivalent, binary operations, multiplication, scalar, structure, homomorphism, equivalence, group ring, module, invertible linear transformations, general linear group, group homomorphism, vector space, group
There are 47 references to this entry.

This is version 5 of group representation, born on 2002-01-23, modified 2007-07-22.
Object id is 1596, canonical name is GroupRepresentation.
Accessed 19135 times total.

Classification:
AMS MSC20C99 (Group theory and generalizations :: Representation theory of groups :: Miscellaneous)
Pending Errata and Addenda
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