Division Algebra

Definition

An algebra $D$ is called a division algebra over field $k$ if any non-zero element has an inverse.

Example. $C$ is a division algebra over $R$ .

Theorem

If $D$ is finite-dimensional division algebra over algebraically closed field $k$ , then $D = k \cdot 1_{D}$ .

\begin{proof} Note that $D^{*} = D ∖ {0}$ is a multiplicative group of $D$ . Then $D$ is a representation of $D^{*}$ , defined as $ρ : D^{*} \to D, u \mapsto u$ . Since $ρ (u_{1} u^{- 1}) u = u_{1}$ for any $u_{1} \in D$ , we have that $ρ$ is a irreducible representation. For any $c \in D$ , $r_{c} : D \to D, v \mapsto v c$ is a homomorphism of irreducible $D^{*}$ -modules. Then by Schur’s lemma, $r_{c} = λ id$ . If $v = 1_{D}$ , then $c = λ 1_{D}$ . It induces a map $f : D \to k, c \mapsto λ$ . Note that $f (c) = f (d)$ iff $c = d$ , so $f$ is injective. On the other hand, for any $μ \in k^{*}$ , there is $f (μ λ^{- 1} c) = μ$ and $f$ is surjective. Therefore, $D = k \cdot 1_{D}$ . \end{proof}

Density Theorem

Proposition

Let $V_{i} (1 ⩽ i ⩽ m)$ be irreducible finite-dimensional pairwise non-isomorphic representations of $A$ , and let $V = \oplus_{i = 1}^{m} n_{i} V_{i}$ , where $n_{i}$ is a number of copies of $V_{i}$ and $W$ is a sub-representation of $V$ . Then $W = \oplus_{i = 1}^{m} r_{i} V_{i}$ , $0 ⩽ r_{i} ⩽ n_{i}$ .

\begin{proof} See here. \end{proof}

To prove the density theorem, we need the following two lemmas.

Lemma

Let $V$ be an irreducible finite dimensional representation of algebra $A$ , and let $v_{1}, \dots, v_{n} \in V$ be any linearly independent vectors. Then for any $w_{1}, \dots, w_{n} \in V$ there exists an element $a \in A$ such that $a v_{i} = w_{i}$ .

\begin{proof} It is a exercise in the List 1. See here. \end{proof}

Lemma

Let $V$ be an irreducible representation of $A$ on dimension $n$ . Then $End (V) ≃ nV$ as $A$ -modules.

\begin{proof} Let $Y = End (V)$ , and choose basis ${v_{1}, \dots, v_{n}}$ for $V$ . Define $φ : Y \to nV$ as $φ (x) = (x v_{1}, \dots, x v_{n})$ for any $x \in Y = End (V)$ . We claim that $φ$ is an isomorphism of $A$ -modules, that is, $End (V) ≃ nV$ . Since $a (x v_{1}, \dots, x v_{n}) = (a x v_{1}, \dots, a x v_{n}) = φ (a x)$ we have that $a φ (x) = φ (a x)$ and $φ$ is a homomorphism. With fixed $v_{1}, \dots, v_{n}$ , any $T \in Y$ becomes $[T]$ with respect to basis $v_{1}, \dots, v_{n}$ . Then $φ : [T] \mapsto (T v_{1}, \dots, T v_{n})$ is a bijection. \end{proof}

Density theorem

i) Let $V$ be irreducible finite-dimensional representation of $A$ . Then the map $ρ : A \to End (V)$ is surjective.

ii) Let $V = V_{1} \oplus \dots \oplus V_{n}$ , where $V_{i}$ are irreducible finite-dimensional pairwise non-isomorphic representations of $A$ . Then $ρ = \oplus ρ_{i} : A \to \oplus End (V_{i})$ is surjective as well.

\begin{proof} (i) Let $B = ρ (A) \subseteq End (V)$ . Take any $c \in End (V)$ and let $v_{1}, \dots, v_{n}$ be a basis of $V$ . Let $w_{i} = c v_{i}$ . But it follows that there exists $a \in A$ such that $w_{i} = a v_{i}$ by ^f1e9c8. So $ρ (a) = c$ and so $ρ$ is surjective.

(ii) Let $B_{i} = ρ_{i} (A) = End (V_{i}) ≃ d_{i} V_{i}$ by ^67e432. Let $B = ρ (A) \subseteq \oplus End (V_{i}) ≃ \oplus d_{i} V_{i}$ where $d_{i} = dim V_{i}$ . Then $B = Im ρ$ is a submodule in $\oplus_{i = 1}^{k} d_{i} V_{i}$ . Conversely, $B = ρ (A) \supseteq ρ_{i} (A) ≃ d_{i} V_{i}$ for all $i$ . Therefore, we have that $B = \oplus End (V_{i})$ . \end{proof}

Theorem

Let $A = \oplus_{i = 1}^{r} M_{d_{i}} (k)$ where $M_{d_{i}} (k)$ is the algebra generated by $d_{i} \times d_{i}$ matrices with entries in $k$ . Then the irreducible representations of $A$ are $V_{1} = k^{d_{1}}, \dots, V_{r} = k^{d_{r}}$ and any finite-dimensional representation of $A$ is direct sum of $V_{i}$ .

\begin{proof} First, the given representations are clearly irreducible, as for any $v \neq = 0, w \in$ $V_{i}$ , there exists $a \in A$ such that $a v = w$ . Next, let $X$ be an $n$ -dimensional representation of $A$ . Then, $X^{*}$ is an $n$ -dimensional representation of $A^{op}$ . But $(Mat_{d_{i}} (k))^{op} ≅ Mat_{d_{i}} (k)$ with isomorphism $φ (X) = X^{T}$ , as $(BC)^{T} = C^{T} B^{T}$ . Thus, $A ≅ A^{op}$ and $X^{*}$ may be viewed as an $n$ -dimensional representation of $A$ . Define

ϕ : n copies A \oplus \dots \oplus A ⟶ X^{*}, (a_{1}, \dots, a_{n}) \mapsto a_{1} y_{1} + \dots + a_{n} y_{n}

where ${y_{i}}$ is a basis of $X^{*}$ . Note that $ϕ$ is clearly surjective, as $k \subset A$ . Thus, the dual map $ϕ^{*} : X ⟶ A^{n *}$ is injective. But $A^{n *} ≅ A^{n}$ as representations of $A$ , which is easy to check. Hence, $Im ϕ^{*} ≅ X$ is a sub-representation of $A^{n}$ . Next, $Mat_{d_{i}} (k) = d_{i} V_{i}$ , so $A = \oplus_{i = 1}^{r} d_{i} V_{i}, A^{n} = \oplus_{i = 1}^{r} n d_{i} V_{i}$ , as a representation of $A$ . Hence by ^ey40pv, $X = \oplus_{i = 1}^{r} m_{i} V_{i}$ , as desired. \end{proof}

Remark. An alternating proof: see Exercise 16 and Etingof.

Radical of Algebra

Definition

We call $rad A$ the set of elements of finite-dimensional algebra $A$ which acts trivially on any vector of irreducible $A$ -module $V$ .

Lemma

$rad A$ is an ideal in $A$ .

Theorem

A finite-dimensional algebra $A$ has only finitely many irreducible representations up to isomorphism. Suppose that $V_{1}, \dots, V_{m}$ is the complete set of irreducible pairwise non-isomorphic modules. Then $V_{i}$ are finite-dimensional and $A / rad A ≃ \oplus_{i = 1}^{m} End V_{i}$ .

\begin{proof} Let $V$ be irreducible. Take non-zero $v \in V$ . Then $A v$ is a non-zero $A$ -submodule in $V$ and $A v$ is finite-dimensional. Since $V$ is irreducible, then $A v = V$ is finite-dimensional. Let $V_{1}, \dots, V_{r}$ be any set of pairwise non-isomorphic irreducible modules. Then by ^ca6f8a, $ρ : A \to \oplus_{i = 1}^{r} End V_{i}$ is surjective. Since $dim A ⩾ dim \oplus_{i = 1}^{r} End V_{r} ⩾ r$ , then $r$ is finite by $dim A$ finite. Consider ${V_{1}, \dots, V_{m}}$ is the complete set of irreducible pairwise non-isomorphic modules. Then the map $ρ : A \to \oplus_{i = 1}^{m} End V_{i}$ is surjective with $ker ρ = rad A$ and so $A / rad A ≃ \oplus_{i = 1}^{m} End V_{i}$ . \end{proof}

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4 Division algebra, density theorem and radical

Division Algebra

Density Theorem

Radical of Algebra

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