Diophantine quintuple

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Conformastatic spacetimes refer to a special class of static solutions to Einstein's equation in general relativity.

Introduction

The line element for the conformastatic class of solutions in Weyl's canonical coordinates reads^{[1][2][3][4][5][6]}
${\displaystyle (1)d{s}^2=-e^{2\mathrm{\Psi }(\rho ,\varphi ,z)}d{t}^2+e^{-2\mathrm{\Psi }(\rho ,\varphi ,z)}(d{\rho }^2+d{z}^2+{\rho }^{2}d{\varphi }^2),}$
as a solution to the field equation
${\displaystyle (2)R_{ab}-\frac{1}{2}R{g}_{ab}=8\pi T_{ab}.}$
Eq(1) has only one metric function ${\displaystyle \mathrm{\Psi }(\rho ,\varphi ,z)}$ to be identified, and for each concrete ${\displaystyle \mathrm{\Psi }(\rho ,\varphi ,z)}$, Eq(1) would yields a specific conformastatic spacetime.

Reduced electrovac field equations

In consistency with the conformastatic geometry Eq(1), the electrostatic field would arise from an electrostatic potential ${\displaystyle A_a}$ without spatial symmetry:^[3][4][5]
${\displaystyle (3)A_a=\mathrm{\Phi }(\rho ,z,\varphi )[dt{]}_a,}$
which would yield the electromagnetic field tensor ${\displaystyle F_{ab}}$ by
${\displaystyle (4)F_{ab}=A_{b;a}-A_{a;b},}$
as well as the corresponding stress-energy tensor by
${\displaystyle (5)T_{ab}^{(EM)}=\frac{1}{4\pi }(F_{ac}{F}_b^c-\frac{1}{4}{g}_{ab}{F}_{cd}{F}^{cd}).}$

Plug Eq(1) and Eqs(3)(4)(5) into "trace-free" (R=0) Einstein's field equation, and one could obtain the reduced field equations for the metric function ${\displaystyle \mathrm{\Psi }(\rho ,\varphi ,z)}$:^[3][5]

${\displaystyle (6){\mathrm{\nabla }}^2\mathrm{\Psi }=e^{-2\mathrm{\Psi }}\mathrm{\nabla }\mathrm{\Phi }\mathrm{\nabla }\mathrm{\Phi }}$
${\displaystyle (7){\mathrm{\Psi }}_i{\mathrm{\Psi }}_j=e^{-2\mathrm{\Psi }}{\mathrm{\Phi }}_i{\mathrm{\Phi }}_j}$

where ${\displaystyle {\mathrm{\nabla }}^2={\partial }_{\rho \rho }+\frac{1}{\rho }{\partial }_{\rho }+\frac{1}{{\rho }^2}{\partial }_{\varphi \varphi }+{\partial }_{zz}}$ and ${\displaystyle \mathrm{\nabla }={\partial }_{\rho }{\hat{e}}_{\rho }+\frac{1}{\rho }{\partial }_{\varphi }{\hat{e}}_{\varphi }+{\partial }_z{\hat{e}}_z}$ are respectively the generic Laplace and gradient operators. in Eq(7), ${\displaystyle i,j}$ run freely over the coordinates ${\displaystyle [\rho ,z,\varphi ]}$.

Linearization of electrovac field equations

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Examples

Extremal Reissner-Nordström spacetime

The extremal Reissner-Nordström spacetime is a typical conformastatic solution. In this case, the metric function is identified as^[4][5]

${\displaystyle (8){\mathrm{\Psi }}_{ERN}=\ln \frac{L}{L+M},L=\sqrt{{\rho }^2+z^2},}$

which put Eq(1) into the concrete form

${\displaystyle (9)d{s}^2=-\frac{L^2}{(L+M{)}^2}d{t}^2+\frac{(L+M{)}^2}{L^2}(d{\rho }^2+d{z}^2+{\rho }^{2}d{\phi }^2).}$

Applying the transformations

${\displaystyle (10)L=r-M,z=(r-M)\cos \theta ,\rho =(r-M)\sin \theta ,}$

one obtains the usual form of the line element of extremal Reissner-Nordström solution,

${\displaystyle (11)d{s}^2=-(1-\frac{M}{r}{)}^{2}d{t}^2+(1-\frac{M}{r}{)}^{2}d{r}^2+r^2(d{\theta }^2+{\sin }^2\theta d{\varphi }^2).}$

Charged dust disks

Some conformastatic solutions have been adopted to describe charged dust disks.^[3]

Comparison with Weyl spacetimes

Many solutions, such as the extremal Reissner-Nordström solution discussed above, can be treated as either a conformastatic metric or Weyl metric, so it would be helpful to make a comparison between them. The Weyl spacetimes refer to the static, axisymmetric class of solutions to Einstein's equation, whose line element takes the following form (still in Weyl's canonical coordinates):
${\displaystyle (12)d{s}^2=-e^{2\psi (\rho ,z)}d{t}^2+e^{2\gamma (\rho ,z)-2\psi (\rho ,z)}(d{\rho }^2+d{z}^2)+e^{-2\psi (\rho ,z)}{\rho }^{2}d{\varphi }^2.}$
Hence, a Weyl solution become conformastatic if the metric function ${\displaystyle \gamma (\rho ,z)}$ vanishes, and the other metric function ${\displaystyle \psi (\rho ,z)}$ drops the axial symmetry:
${\displaystyle (13)\gamma (\rho ,z)\equiv 0,\psi (\rho ,z)\mapsto \mathrm{\Psi }(\rho ,\varphi ,z).}$
The Weyl electrovac field equations would reduce to the following ones with ${\displaystyle \gamma (\rho ,z)}$:

${\displaystyle (14.a){\mathrm{\nabla }}^2\psi =(\mathrm{\nabla }\psi {)}^2}$
${\displaystyle (14.b){\mathrm{\nabla }}^2\psi =e^{-2\psi }(\mathrm{\nabla }\mathrm{\Phi }{)}^2}$
${\displaystyle (14.c){\psi }_{,\rho }^2-{\psi }_{,z}^2=e^{-2\psi }({\mathrm{\Phi }}_{,\rho }^2-{\mathrm{\Phi }}_{,z}^2)}$
${\displaystyle (14.d)2{\psi }_{,\rho }{\psi }_{,z}=2e^{-2\psi }{\mathrm{\Phi }}_{,\rho }{\mathrm{\Phi }}_{,z}}$
${\displaystyle (14.e){\mathrm{\nabla }}^2\mathrm{\Phi }=2\mathrm{\nabla }\psi \mathrm{\nabla }\mathrm{\Phi },}$

where ${\displaystyle {\mathrm{\nabla }}^2={\partial }_{\rho \rho }+\frac{1}{\rho }{\partial }_{\rho }+{\partial }_{zz}}$ and ${\displaystyle \mathrm{\nabla }={\partial }_{\rho }{\hat{e}}_{\rho }+{\partial }_z{\hat{e}}_z}$ are respectively the reduced cylindrically symmetric Laplace and gradient operators.

It is also noticeable that, Eqs(14) for Weyl are consistent but not identical with the conformastatic Eqs(6)(7) above.

References

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See also

• Weyl metrics
• Reissner–Nordström metric