Brinkmann coordinates

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Brinkmann coordinates are a particular coordinate system for a spacetime belonging to the family of pp-wave metrics. In terms of these coordinates, the metric tensor can be written as

$ds^2 \, = H(u,x,y) du^2 + 2 du dv + dx^2 + dy^2$

where $\partial_{v}$ , the coordinate vector field dual to the covector field $d v$ , is a null vector field. Indeed, geometrically speaking, it is a null geodesic congruence with vanishing optical scalars. Physically speaking, it serves as the wave vector defining the direction of propagation for the pp-wave.

The coordinate vector field $\partial_{u}$ can be spacelike, null, or timelike at a given event in the spacetime, depending upon the sign of $H (u, x, y)$ at that event. The coordinate vector fields $\partial_{x}, \partial_{y}$ are both spacelike vector fields. Each surface $u = u 0, v = v 0$ can be thought of as a wavefront.

In discussions of exact solutions to the Einstein field equation, many authors fail to specify the intended range of the coordinate variables $u, v, x, y$ . Here we should take

$-\infty < v,x,y < \infty, u_{0} < u < u_{1}$

to allow for the possibility that the pp-wave develops a null curvature singularity.

[edit] References

Stephani, Hans; Kramer, Dietrich; MacCallum, Malcolm; Hoenselaers, Cornelius & Herlt, Eduard (2003). Exact Solutions of Einstein's Field Equations. Cambridge: Cambridge University Press. ISBN 0-521-46136-7.
H. W. Brinkmann (1925). "Einstein spaces which are mapped conformally on each other". Math. Ann. 18: 119.