Borel subalgebra

In mathematics, specifically in representation theory, a Borel subalgebra of a Lie algebra ${\displaystyle 𝔤}$ is a maximal solvable subalgebra.^[1] The notion is named after Armand Borel.

If the Lie algebra ${\displaystyle 𝔤}$ is the Lie algebra of a complex Lie group, then a Borel subalgebra is the Lie algebra of a Borel subgroup.

Let ${\displaystyle 𝔤=𝔤𝔩(V)}$ be the Lie algebra of the endomorphisms of a finite-dimensional vector space V over the complex numbers. Then to specify a Borel subalgebra of ${\displaystyle 𝔤}$ amounts to specify a flag of V; given a flag ${\displaystyle V=V_0\supset V_1\supset \cdots \supset V_n=0}$, the subspace ${\displaystyle 𝔟=\{x\in 𝔤\mid x(V_i)\subset V_i,1\le i\le n\}}$ is a Borel subalgebra,^[2] and conversely, each Borel subalgebra is of that form by Lie's theorem. Hence, the Borel subalgebras are classified by the flag variety of V.

Let ${\displaystyle 𝔤}$ be a complex semisimple Lie algebra, ${\displaystyle 𝔥}$ a Cartan subalgebra and R the root system associated to them. Choosing a base of R gives the notion of positive roots. Then ${\displaystyle 𝔤}$ has the decomposition ${\displaystyle 𝔤={𝔫}^{-}\oplus 𝔥\oplus {𝔫}^{+}}$ where ${\displaystyle {𝔫}^{\pm }=\sum _{\alpha >0}{𝔤}_{\pm \alpha }}$. Then ${\displaystyle 𝔟=𝔥\oplus {𝔫}^{+}}$ is the Borel subalgebra relative to the above setup.^[3] (It is solvable since the derived algebra ${\displaystyle [𝔟,𝔟]}$ is nilpotent. It is maximal solvable by a theorem of Borel–Morozov on the conjugacy of solvable subalgebras.^[4])

Given a ${\displaystyle 𝔤}$-module V, a primitive element of V is a (nonzero) vector that (1) is a weight vector for ${\displaystyle 𝔥}$ and that (2) is annihilated by ${\displaystyle {𝔫}^{+}}$. It is the same thing as a ${\displaystyle 𝔟}$-weight vector (Proof: if ${\displaystyle h\in 𝔥}$ and ${\displaystyle e\in {𝔫}^{+}}$ with ${\displaystyle [h,e]=2e}$ and if ${\displaystyle 𝔟\cdot v}$ is a line, then ${\displaystyle 0=[h,e]\cdot v=2e\cdot v}$.)

• Borel subgroup
• Parabolic Lie algebra

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