Polarization (Lie algebra)

In representation theory, polarization is the maximal totally isotropic subspace of a certain skew-symmetric bilinear form on a Lie algebra. The notion of polarization plays an important role in construction of irreducible unitary representations of some classes of Lie groups by means of the orbit method^[1] as well as in harmonic analysis on Lie groups and mathematical physics.

Let ${\displaystyle G}$ be a Lie group, ${\displaystyle 𝔤}$ the corresponding Lie algebra and ${\displaystyle {𝔤}^{*}}$ its dual. Let ${\displaystyle ⟨f,X⟩}$ denote the value of the linear form (covector) ${\displaystyle f\in {𝔤}^{*}}$ on a vector ${\displaystyle X\in 𝔤}$. The subalgebra ${\displaystyle 𝔥}$ of the algebra ${\displaystyle 𝔤}$ is called subordinate of ${\displaystyle f\in {𝔤}^{*}}$ if the condition

${\displaystyle \mathrm{\forall }X,Y\in 𝔥⟨f,[X,Y]⟩=0}$,

or, alternatively,

${\displaystyle ⟨f,[𝔥,𝔥]⟩=0}$

is satisfied. Further, let the group ${\displaystyle G}$ act on the space ${\displaystyle {𝔤}^{*}}$ via coadjoint representation ${\displaystyle {\mathrm{A}\mathrm{d}}^{*}}$. Let ${\displaystyle {𝒪}_f}$ be the orbit of such action which passes through the point ${\displaystyle f}$ and let ${\displaystyle {𝔤}^f}$ be the Lie algebra of the stabilizer ${\displaystyle \mathrm{S}\mathrm{t}\mathrm{a}\mathrm{b}(f)}$ of the point ${\displaystyle f}$. A subalgebra ${\displaystyle 𝔥\subset 𝔤}$ subordinate of ${\displaystyle f}$ is called a polarization of the algebra ${\displaystyle 𝔤}$ with respect to ${\displaystyle f}$, or, more concisely, polarization of the covector ${\displaystyle f}$, if it has maximal possible dimensionality, namely

${\displaystyle \dim 𝔥=\frac{1}{2}(\dim 𝔤+\dim {𝔤}^f)=\dim 𝔤-\frac{1}{2}\dim {𝒪}_f}$.

The following condition was obtained by L. Pukanszky:^[2]

Let ${\displaystyle 𝔥}$ be the polarization of algebra ${\displaystyle 𝔤}$ with respect to covector ${\displaystyle f}$ and ${\displaystyle {𝔥}^{\perp }}$ be its annihilator: ${\displaystyle {𝔥}^{\perp }:=\{\lambda \in {𝔤}^{*}|⟨\lambda ,𝔥⟩=0\}}$. The polarization ${\displaystyle 𝔥}$ is said to satisfy the Pukanszky condition if

${\displaystyle f+{𝔥}^{\perp }\in {𝒪}_f.}$

L. Pukanszky has shown that this condition guaranties applicability of the Kirillov's orbit method initially constructed for nilpotent groups to more general case of solvable groups as well.^[3]

• Polarization is the maximal totally isotropic subspace of the bilinear form ${\displaystyle ⟨f,[\cdot ,\cdot ]⟩}$ on the Lie algebra ${\displaystyle 𝔤}$.^[4]
• For some pairs ${\displaystyle (𝔤,f)}$ polarization may not exist.^[4]
• If the polarization does exist for the covector ${\displaystyle f}$, then it exists for every point of the orbit ${\displaystyle {𝒪}_f}$ as well, and if ${\displaystyle 𝔥}$ is the polarization for ${\displaystyle f}$, then ${\displaystyle {\mathrm{A}\mathrm{d}}_g𝔥}$ is the polarization for ${\displaystyle {\mathrm{A}\mathrm{d}}_g^{*}f}$. Thus, the existence of the polarization is the property of the orbit as a whole.^[4]
• If the Lie algebra ${\displaystyle 𝔤}$ is completely solvable, it admits the polarization for any point ${\displaystyle f\in {𝔤}^{*}}$.^[5]
• If ${\displaystyle 𝒪}$ is the orbit of general position (i. e. has maximal dimensionality), for every point ${\displaystyle f\in 𝒪}$ there exists solvable polarization.^[5]

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