The tetrad formulation is a special case of a more general formulation, known as the vielbein or n-bein formulation, with n=4. Make note of the spelling: in German, "viel" means "many", not to be confused with "vier", meaning "four".

In the vielbein formalism,^[5] an open cover of the spacetime manifold ${\displaystyle M}$  and a local basis for each of those open sets is chosen: a set of ${\displaystyle n}$  independent vector fields

${\displaystyle e_{a}=e_{a}{}^{\mu }\partial _{\mu }}$ 

for ${\displaystyle a=1,\ldots ,n}$  that together span the ${\displaystyle n}$ -dimensional tangent bundle at each point in the set. Dually, a vielbein (or tetrad in 4 dimensions) determines (and is determined by) a dual co-vielbein (co-tetrad) — a set of ${\displaystyle n}$  independent 1-forms.

${\displaystyle e^{a}=e^{a}{}_{\mu }dx^{\mu }}$ 

such that

${\displaystyle e^{a}(e_{b})=e^{a}{}_{\mu }e_{b}{}^{\mu }=\delta _{b}^{a},}$ 

where ${\displaystyle \delta _{b}^{a}}$  is the Kronecker delta. A vielbein is usually specified by its coefficients ${\displaystyle e^{\mu }{}_{a}}$  with respect to a coordinate basis, despite the choice of a set of (local) coordinates ${\displaystyle x^{\mu }}$  being unnecessary for the specification of a tetrad. Each covector is a solder form.

From the point of view of the differential geometry of fiber bundles, the n vector fields ${\displaystyle \{e_{a}\}_{a=1\dots n}}$  define a section of the frame bundle i.e. a parallelization of ${\displaystyle U\subset M}$  which is equivalent to an isomorphism ${\displaystyle TU\cong U\times {\mathbb {R} ^{n}}}$ . Since not every manifold is parallelizable, a vielbein can generally only be chosen locally (i.e. only on a coordinate chart ${\displaystyle U}$  and not all of ${\displaystyle M}$ .)

All tensors of the theory can be expressed in the vector and covector basis, by expressing them as linear combinations of members of the (co)vielbein. For example, the spacetime metric tensor can be transformed from a coordinate basis to the tetrad basis.

Popular tetrad bases in general relativity include orthonormal tetrads and null tetrads. Null tetrads are composed of four null vectors, so are used frequently in problems dealing with radiation, and are the basis of the Newman–Penrose formalism and the GHP formalism.

The standard formalism of differential geometry (and general relativity) consists simply of using the coordinate tetrad in the tetrad formalism. The coordinate tetrad is the canonical set of vectors associated with the coordinate chart. The coordinate tetrad is commonly denoted ${\displaystyle \{\partial _{\mu }\}}$  whereas the dual cotetrad is denoted ${\displaystyle \{dx^{\mu }\}}$ . These tangent vectors are usually defined as directional derivative operators: given a chart ${\displaystyle {\varphi =(\varphi ^{1},\ldots ,\varphi ^{n})}}$  which maps a subset of the manifold into coordinate space ${\displaystyle \mathbb {R} ^{n}}$ , and any scalar field ${\displaystyle f}$ , the coordinate vectors are such that:

${\displaystyle \partial _{\mu }[f]\equiv {\frac {\partial (f\circ \varphi ^{-1})}{\partial x^{\mu }}}.}$ 

The definition of the cotetrad uses the usual abuse of notation ${\displaystyle dx^{\mu }=d\varphi ^{\mu }}$  to define covectors (1-forms) on ${\displaystyle M}$ . The involvement of the coordinate tetrad is not usually made explicit in the standard formalism. In the tetrad formalism, instead of writing tensor equations out fully (including tetrad elements and tensor products ${\displaystyle \otimes }$  as above) only components of the tensors are mentioned. For example, the metric is written as "${\displaystyle g_{ab}}$ ". When the tetrad is unspecified this becomes a matter of specifying the type of the tensor called abstract index notation. It allows to easily specify contraction between tensors by repeating indices as in the Einstein summation convention.

Changing tetrads is a routine operation in the standard formalism, as it is involved in every coordinate transformation (i.e., changing from one coordinate tetrad basis to another). Switching between multiple coordinate charts is necessary because, except in trivial cases, it is not possible for a single coordinate chart to cover the entire manifold. Changing to and between general tetrads is much similar and equally necessary (except for parallelizable manifolds). Any tensor can locally be written in terms of this coordinate tetrad or a general (co)tetrad.

For example, the metric tensor ${\displaystyle \mathbf {g} }$  can be expressed as:

${\displaystyle \mathbf {g} =g_{\mu \nu }dx^{\mu }dx^{\nu }\qquad {\text{where}}~g_{\mu \nu }=\mathbf {g} (\partial _{\mu },\partial _{\nu }).}$ 

(Here we use the Einstein summation convention). Likewise, the metric can be expressed with respect to an arbitrary (co)tetrad as

${\displaystyle \mathbf {g} =g_{ab}e^{a}e^{b}\qquad {\text{where}}~g_{ab}=\mathbf {g} \left(e_{a},e_{b}\right).}$ 

Here, we use choice of alphabet (Latin and Greek) for the index variables to distinguish the applicable basis.

We can translate from a general co-tetrad to the coordinate co-tetrad by expanding the covector ${\displaystyle e^{a}=e^{a}{}_{\mu }dx^{\mu }}$ . We then get

${\displaystyle \mathbf {g} =g_{ab}e^{a}e^{b}=g_{ab}e^{a}{}_{\mu }e^{b}{}_{\nu }dx^{\mu }dx^{\nu }=g_{\mu \nu }dx^{\mu }dx^{\nu }}$ 

from which it follows that ${\displaystyle g_{\mu \nu }=g_{ab}e^{a}{}_{\mu }e^{b}{}_{\nu }}$ . Likewise expanding ${\displaystyle dx^{\mu }=e^{\mu }{}_{a}e^{a}}$  with respect to the general tetrad, we get

${\displaystyle \mathbf {g} =g_{\mu \nu }dx^{\mu }dx^{\nu }=g_{\mu \nu }e^{\mu }{}_{a}e^{\nu }{}_{b}e^{a}e^{b}=g_{ab}e^{a}e^{b}}$ 

which shows that ${\displaystyle g_{ab}=g_{\mu \nu }e^{\mu }{}_{a}e^{\nu }{}_{b}}$ .

Manipulation of indices edit

The manipulation with tetrad coefficients shows that abstract index formulas can, in principle, be obtained from tensor formulas with respect to a coordinate tetrad by "replacing greek by latin indices". However care must be taken that a coordinate tetrad formula defines a genuine tensor when differentiation is involved. Since the coordinate vector fields have vanishing Lie bracket (i.e. commute: ${\displaystyle \partial _{\mu }\partial _{\nu }=\partial _{\nu }\partial _{\mu }}$ ), naive substitutions of formulas that correctly compute tensor coefficients with respect to a coordinate tetrad may not correctly define a tensor with respect to a general tetrad because the Lie bracket is non-vanishing: ${\displaystyle [e_{a},e_{b}]\neq 0}$ . Thus, it is sometimes said that tetrad coordinates provide a non-holonomic basis.

For example, the Riemann curvature tensor is defined for general vector fields ${\displaystyle X,Y}$  by

${\displaystyle R(X,Y)=\left(\nabla _{X}\nabla _{Y}-\nabla _{Y}\nabla _{X}-\nabla _{[X,Y]}\right)}$ .

In a coordinate tetrad this gives tensor coefficients

${\displaystyle R_{\ \nu \sigma \tau }^{\mu }=dx^{\mu }\left((\nabla _{\sigma }\nabla _{\tau }-\nabla _{\tau }\nabla _{\sigma })\partial _{\nu }\right).}$ 

The naive "Greek to Latin" substitution of the latter expression

${\displaystyle R_{\ bcd}^{a}=e^{a}\left((\nabla _{c}\nabla _{d}-\nabla _{d}\nabla _{c})e_{b}\right)\qquad {\text{(wrong!)}}}$ 

is incorrect because for fixed c and d, ${\displaystyle \left(\nabla _{c}\nabla _{d}-\nabla _{d}\nabla _{c}\right)}$  is, in general, a first order differential operator rather than a zeroth order operator which defines a tensor coefficient. Substituting a general tetrad basis in the abstract formula we find the proper definition of the curvature in abstract index notation, however:

${\displaystyle R_{\ bcd}^{a}=e^{a}\left((\nabla _{c}\nabla _{d}-\nabla _{d}\nabla _{c}-f_{cd}{}^{e}\nabla _{e})e_{b}\right)}$ 

where ${\displaystyle [e_{a},e_{b}]=f_{ab}{}^{c}e_{c}}$ . Note that the expression ${\displaystyle \left(\nabla _{c}\nabla _{d}-\nabla _{d}\nabla _{c}-f_{cd}{}^{e}\nabla _{e}\right)}$  is indeed a zeroth order operator, hence (the (c d)-component of) a tensor. Since it agrees with the coordinate expression for the curvature when specialised to a coordinate tetrad it is clear, even without using the abstract definition of the curvature, that it defines the same tensor as the coordinate basis expression.

Given a vector (or covector) in the tangent (or cotangent) manifold, the exponential map describes the corresponding geodesic of that tangent vector. Writing ${\displaystyle X\in TM}$ , the parallel transport of a differential corresponds to

${\displaystyle e^{-X}de^{X}=dX-{\frac {1}{2!}}\left[X,dX\right]+{\frac {1}{3!}}[X,[X,dX]]-{\frac {1}{4!}}[X,[X,[X,dX]]]+\cdots }$ 

The above can be readily verified simply by taking ${\displaystyle X}$  to be a matrix.

For the special case of a Lie algebra, the ${\displaystyle X}$  can be taken to be an element of the algebra, the exponential is the exponential map of a Lie group, and group elements correspond to the geodesics of the tangent vector. Choosing a basis ${\displaystyle e_{i}}$  for the Lie algebra and writing ${\displaystyle X=X^{i}e_{i}}$  for some functions ${\displaystyle X^{i},}$  the commutators can be explicitly written out. One readily computes that

${\displaystyle e^{-X}de^{X}=dX^{i}e_{i}-{\frac {1}{2!}}X^{i}dX^{j}{f_{ij}}^{k}e_{k}+{\frac {1}{3!}}X^{i}X^{j}dX^{k}{f_{jk}}^{l}{f_{il}}^{m}e_{m}-\cdots }$ 

for ${\displaystyle [e_{i},e_{j}]={f_{ij}}^{k}e_{k}}$  the structure constants of the Lie algebra. The series can be written more compactly as

${\displaystyle e^{-X}de^{X}=e_{i}{W^{i}}_{j}dX^{j}}$ 

with the infinite series

${\displaystyle W=\sum _{n=0}^{\infty }{\frac {(-1)^{n}M^{n}}{(n+1)!}}=(I-e^{-M})M^{-1}.}$ 

Here, ${\displaystyle M}$  is a matrix whose matrix elements are ${\displaystyle {M_{j}}^{k}=X^{i}{f_{ij}}^{k}}$ . The matrix ${\displaystyle W}$  is then the vielbein; it expresses the differential ${\displaystyle dX^{j}}$  in terms of the "flat coordinates" (orthonormal, at that) ${\displaystyle e_{i}}$ .

Given some map ${\displaystyle N\to G}$  from some manifold ${\displaystyle N}$  to some Lie group ${\displaystyle G}$ , the metric tensor on the manifold ${\displaystyle N}$  becomes the pullback of the metric tensor ${\displaystyle B_{mn}}$  on the Lie group ${\displaystyle G}$ :

${\displaystyle g_{ij}={W_{i}}^{m}B_{mn}{W^{n}}_{j}}$ 

The metric tensor ${\displaystyle B_{mn}}$  on the Lie group is the Cartan metric, aka the Killing form. Note that, as a matrix, the second W is the transpose. For ${\displaystyle N}$  a (pseudo-)Riemannian manifold, the metric is a (pseudo-)Riemannian metric. The above generalizes to the case of symmetric spaces.^[6] These vielbeins are used to perform calculations in sigma models, of which the supergravity theories are a special case.^[7]

• De Felice, F.; Clarke, C.J.S. (1990), Relativity on Curved Manifolds (first published 1990 ed.), Cambridge University Press, ISBN 0-521-26639-4
• Benn, I.M.; Tucker, R.W. (1987), An introduction to Spinors and Geometry with Applications in Physics (first published 1987 ed.), Adam Hilger, ISBN 0-85274-169-3