Lie algebra–valued differential form

In differential geometry, a Lie algebra-valued form is a differential form with values in a Lie algebra. Such forms have important applications in the theory of connections on a principal bundle as well as in the theory of Cartan connections.

Wedge product

Since every Lie algebra has a bilinear Lie bracket operation, the wedge product of two Lie algebra-valued forms can be composed with the bracket operation to obtain another Lie algebra-valued form. This operation, denoted by $[\omega \wedge \eta ]$ , is given by: for ${\mathfrak {g}}$ -valued p-form $\omega$ and ${\mathfrak {g}}$ -valued q-form $\eta$

[\omega \wedge \eta ](v_{1},\cdots ,v_{p+q})={1 \over (p+q)!}\sum _{\sigma }\operatorname {sgn} (\sigma )[\omega (v_{\sigma (1)},\cdots ,v_{\sigma (p)}),\eta (v_{\sigma (p+1)},\cdots ,v_{\sigma (p+q)})]

where v_i's are tangent vectors. The notation is meant to indicate both operations involved. For example, if $\omega$ and $\eta$ are Lie algebra-valued one forms, then one has

[\omega \wedge \eta ](v_{1},v_{2})={1 \over 2}([\omega (v_{1}),\eta (v_{2})]-[\omega (v_{2}),\eta (v_{1})]).

The operation $[\omega \wedge \eta ]$ can also be defined as the bilinear operation on $\Omega (M,{\mathfrak {g}})$ satisfying

[(g\otimes \alpha )\wedge (h\otimes \beta )]=[g,h]\otimes (\alpha \wedge \beta )

for all $g,h\in {\mathfrak {g}}$ and $\alpha ,\beta \in \Omega (M,\mathbb {R} )$ .

The alternative notation $[\omega ,\eta ]$ , which resembles a commutator, is justified by the fact that if the Lie algebra ${\mathfrak {g}}$ is a matrix algebra then $[\omega \wedge \eta ]$ is nothing but the graded commutator of $\omega$ and $\eta$ , i. e. if $\omega \in \Omega ^{p}(M,{\mathfrak {g}})$ and $\eta \in \Omega ^{q}(M,{\mathfrak {g}})$ then

[\omega \wedge \eta ]=\omega \wedge \eta -(-1)^{pq}\eta \wedge \omega ,

where $\omega \wedge \eta ,\ \eta \wedge \omega \in \Omega ^{p+q}(M,{\mathfrak {g}})$ are wedge products formed using the matrix multiplication on ${\mathfrak {g}}$ .

Operations

Let $f:{\mathfrak {g}}\to {\mathfrak {h}}$ be a Lie algebra homomorphism. If φ is a ${\mathfrak {g}}$ -valued form on a manifold, then f(φ) is an ${\mathfrak {h}}$ -valued form on the same manifold obtained by applying f to the values of φ: $f(\phi )(v_{1},\dots ,v_{k})=f(\phi (v_{1},\dots ,v_{k}))$ .

Similarly, if f is a multilinear functional on $\textstyle \prod _{1}^{k}{\mathfrak {g}}$ , then one puts^[1]

f(\phi _{1},\dots ,\phi _{k})(v_{1},\dots ,v_{q})={1 \over q!}\sum _{\sigma }\operatorname {sgn} (\sigma )f(\phi _{1}(v_{\sigma (1)},\dots ,v_{\sigma (q_{1})}),\dots ,\phi _{k}(v_{\sigma (q-q_{k}+1)},\dots ,v_{\sigma (q)}))

where q = q₁ + … + q_k and φ_i are ${\mathfrak {g}}$ -valued q_i-forms. Moreover, given a vector space V, the same formula can be used to define the V-valued form $f(\phi ,\eta )$ when

f:{\mathfrak {g}}\times V\to V

is a multilinear map, φ is a ${\mathfrak {g}}$ -valued form and η is a V-valued form. Note such a f amounts to the linear action of ${\mathfrak {g}}$ on V; i.e., f determines the representation

\rho :{\mathfrak {g}}\to V,\rho (x)y=f(x,y)

when f([x, y], z) = f(x, f(y, z)) - f(y, f(x, z)) and, conversely, any representaiton ρ determines f with the condition. For example, if $f(x,y)=[x,y]$ (the bracket of ${\mathfrak {g}}$ ), then we recover the definition of $[\cdot \wedge \cdot ]$ given above, with ρ = ad, the adjoint representation.

Example: If ω is a ${\mathfrak {g}}$ -valued one-form (for example, a connection form), f(x, y) = ρ(x)y with ρ a representation of ${\mathfrak {g}}$ on a vector space V and φ a V-valued form, then $f([\omega \wedge \omega ],\phi )=2f(\omega ,f(\omega ,\phi )).$

Forms with values in an adjoint bundle

Let P be a smooth principal bundle with structure group G and ${\mathfrak {g}}=\operatorname {Lie} (G)$ . G acts on ${\mathfrak {g}}$ via adjoint representation and so one can form the associated bundle:

{\mathfrak {g}}_{P}=P\times _{\operatorname {Ad} }{\mathfrak {g}}.

Any ${\mathfrak {g}}_{P}$ -valued forms on the base space of P are in a natural one-to-one correspondence with any tensorial forms on P of adjoint type.

Notes

^ Kobayashi–Nomizu, Ch. XII, § 1.

References

S. Kobayashi, K. Nomizu. Foundations of Differential Geometry (Wiley Classics Library) Volume 1, 2.

External links

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[1] Kobayashi–Nomizu, Ch. XII, § 1.

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