vierbein

Vierbein, or tetrad, is a field that provides a local orthonormal frame at each point of a four-dimensional spacetime. It consists of four vector fields e_μ^a, where μ is a curved spacetime index and a is a flat local Lorentz index. The spacetime metric g_μν is recovered from the Minkowski metric η_ab via g_μν = η_ab e_μ^a e_ν^b. The inverse tetrad e_a^μ satisfies e_a^μ e_μ^b = δ_a^b and e_μ^a e_a^ν = δ_μ^ν. Thus, at each point the e_μ^a form an orthonormal basis for the tangent space, providing a bridge between curved spacetime and a locally flat frame.

The tetrad formalism is particularly important for coupling fermions to gravity, since spinor fields transform under

Related relations include det e_μ^a = √(-g). The formalism exhibits local Lorentz invariance: e_μ^a transforms under local