The FLRW metric assumes
homogeneity and
isotropy of space. It also assumes that the spatial component of the metric can be time-dependent. The generic metric that meets these conditions is -c^2\mathrm{d}\tau^2 = -c^2\mathrm{d}t^2 + {a(t)}^2 \mathrm{d}\mathbf{\Sigma}^2, where \mathbf{\Sigma} ranges over a 3-dimensional space of uniform curvature, that is,
elliptical space,
Euclidean space, or
hyperbolic space. It is normally written as a function of three spatial coordinates, but there are several conventions for doing so, detailed below. \mathrm{d}\mathbf{\Sigma} does not depend on t – all of the time dependence is in the function known as the "
scale factor".
Reduced-circumference polar coordinates In reduced-circumference polar coordinates, the spatial metric has the form \mathrm{d}\mathbf{\Sigma}^2 = \frac{\mathrm{d}r^2}{1-k r^2} + r^2 \mathrm{d}\mathbf{\Omega}^2, \quad \text{ where } \mathrm{d}\mathbf{\Omega}^2 = \mathrm{d}\theta^2 + \sin^2 \theta \, \mathrm{d}\phi^2. k is a constant representing the curvature of the space. There are two common unit conventions: • k may be taken to have units of length−2, in which case r has units of length and a(t) is unitless. then the
Gaussian curvature of the space at the time when sometimes called the reduced
circumference because it is equal to the measured circumference of a circle (at that value of centered at the origin, divided by 2\pi (like the r of
Schwarzschild coordinates). Where appropriate, often chosen to equal 1 in the present cosmological era, so that \mathrm{d}\mathbf{\Sigma} measures
comoving distance. • Alternatively, k may be taken to belong to the set (for negative, zero, and positive curvature, respectively). Then unitless and a(t) has units of length. When a(t) is the
radius of curvature of the space and may also be written A disadvantage of reduced circumference coordinates is that they cover only half of the 3-sphere in the case of positive curvature—circumferences beyond that point begin to decrease, leading to degeneracy. (This is not a problem if space is
elliptical, i.e., a 3-sphere with opposite points identified.)
Hyperspherical coordinates In
hyperspherical or
curvature-normalized coordinates, the coordinate r is proportional to radial distance; this gives \mathrm{d}\mathbf{\Sigma}^2 = \mathrm{d}r^2 + S_k(r)^2 \, \mathrm{d}\mathbf{\Omega}^2 where \mathrm{d}\mathbf{\Omega} is as before and S_k(r) = \begin{cases} \sqrt{k}^{\,-1} \sin (r \sqrt{k}), &k > 0 \\ r, &k = 0 \\ \sqrt^{\,-1} \sinh (r \sqrt), &k As before, there are two common unit conventions: • k may be taken to have units of length−2, in which case r has units of length and a(t) is unitless. then the
Gaussian curvature of the space at the time when Where appropriate, a(t) is often chosen to equal 1 in the present cosmological era, so that \mathrm{d}\mathbf{\Sigma} measures
comoving distance. • Alternatively, as before, k may be taken to belong to the set (for negative, zero, and positive curvature respectively). Then r is unitless and a(t) has units of length. When a(t) is the
radius of curvature of the space and may also be written Note that when essentially a third angle along with \theta and The letter \chi may be used instead Though it is usually defined piecewise as above, S is an
analytic function of both k and It can also be written as a
power series S_k(r) = \sum_{n=0}^\infty \frac{{\left(-1\right)}^n k^n r^{2n+1}}{(2n+1)!} = r - \frac{k r^3}{6} + \frac{k^2 r^5}{120} - \cdots or as S_k(r) = r \; \mathrm{sinc} \, (r \sqrt{k}), where \mathrm{sinc} is the unnormalized
sinc function and \sqrt{k} is one of the imaginary, zero, or real square roots These definitions are valid for
Cartesian coordinates When k = 0 one may write simply \mathrm{d}\mathbf{\Sigma}^2 = \mathrm{d}x^2 + \mathrm{d}y^2 + \mathrm{d}z^2. This can be extended to k \ne 0 by defining \begin{align} x &= r \cos \theta \,, \\ y &= r \sin \theta \cos \phi \,, \\ z &= r \sin \theta \sin \phi \,, \end{align} where r is one of the radial coordinates defined above, but this is rare. ==Curvature==