Lie algebra representation

A representation of a Lie algebra $𝔤$ is a Lie algebra homomorphism

where $EndV$ is the commutator Liealgebra of some vector space $V$. In other words, $\rho$ is a linearmapping that satisfies

Alternatively, one calls $V$ a $𝔤$-module, and calls $\rho (a),a\in 𝔤$ the action of $a$ on $V$.

We call the representation faithful if $\rho$ is injective.

A invariant subspace or sub-module $W\subset V$ is a subspace of $V$ satisfying $\rho (a)(W)\subset W$ for all $a\in 𝔤$. A representation iscalled irreducible or simple if its only invariant subspaces are $\{0\}$and the whole representation.

The dimension of $V$ is called the dimension of the representation.If $V$ is infinite-dimensional, then one speaks of aninfinite-dimensional representation.

Given a pair of representations, we can define a new representation, called the direct sum of the two given representations:

If $\rho :𝔤\to End(V)$ and $\sigma :𝔤\to End(W)$ are representations, then $V\oplus W$ has the obvious Lie algebra action, by the embedding $End(V)\times End(W)\hookrightarrow End(V\oplus W)$.