Light-cone coordinates

In special relativity, light-cone coordinates is a special coordinate system where two of the coordinates, x⁺ and x⁻ are null coordinates and all the other coordinates are spatial. Call them ${\displaystyle x_{\perp }}$.

Assume we are working with a (d,1) Lorentzian signature.

Instead of the standard coordinate system (using Einstein notation)

${\displaystyle ds^{2}=-dt^{2}+\delta _{ij}dx^{i}dx^{j}}$,

with ${\displaystyle i,j=1,\dots ,d}$ we have

${\displaystyle ds^{2}=-2dx^{+}dx^{-}+\delta _{ij}dx^{i}dx^{j}}$

with ${\displaystyle i,j=1,\dots ,d-1}$, ${\displaystyle x^{+}={\frac {t+x}{\sqrt {2}}}}$ and ${\displaystyle x^{-}={\frac {t-x}{\sqrt {2}}}}$.

Both x⁺ and x⁻ can act as "time" coordinates.

One nice thing about light cone coordinates is that the causal structure is partially included into the coordinate system itself.

A boost in the tx plane shows up as ${\displaystyle x^{+}\to e^{+\beta }x^{+}}$, ${\displaystyle x^{-}\to e^{-\beta }x^{-}}$, ${\displaystyle x^{i}\to x^{i}}$. A rotation in the ij-plane only affects ${\displaystyle x_{\perp }}$. The parabolic transformations show up as ${\displaystyle x^{+}\to x^{+}}$, ${\displaystyle x^{-}\to x^{-}+\delta _{ij}\alpha ^{i}x^{j}+{\frac {\alpha ^{2}}{2}}x^{+}}$, ${\displaystyle x^{i}\to x^{i}+\alpha ^{i}x^{+}}$. Another set of parabolic transformations show up as ${\displaystyle x^{+}\to x^{+}+\delta _{ij}\alpha ^{i}x^{j}+{\frac {\alpha ^{2}}{2}}x^{-}}$, ${\displaystyle x^{-}\to x^{-}}$ and ${\displaystyle x^{i}\to x^{i}+\alpha ^{i}x^{-}}$.

Light cone coordinates can also be generalized to curved spacetime in general relativity. Sometimes calculations simplify using light cone coordinates. See Newman–Penrose formalism. Light cone coordinates are sometimes used to describe relativistic collisions, especially if the relative velocity is very close to the speed of light. They are also used in the light cone gauge of string theory.

A closed string is a generalization of a particle. The spatial coordinate of a point on the string is conveniently described by a parameter ${\displaystyle \sigma }$ which runs from ${\displaystyle 0}$ to ${\displaystyle 2\pi }$. Time is appropriately described by a parameter ${\displaystyle \sigma _{0}}$. Associating each point on the string in a D-dimensional spacetime with coordinates ${\displaystyle x_{0},x}$ and transverse coordinates ${\displaystyle x_{i},i=2,...,D}$, these coordinates play the role of fields in a ${\displaystyle 1+1}$ dimensional field theory. Clearly, for such a theory more is required. It is convenient to employ instead of ${\displaystyle x=\sigma _{0},x}$ light-cone coordinates ${\displaystyle x_{\pm }}$ given by

${\displaystyle x_{\pm }={\frac {1}{\sqrt {2}}}(x_{0}\pm x)}$

so that the metric ${\displaystyle ds^{2}}$ is given by

${\displaystyle ds^{2}=2dx_{+}dx_{-}-(dx_{i})^{2}}$

(summation over ${\displaystyle i}$ understood). There is some gauge freedom. First, we can set ${\displaystyle x=\sigma _{0}}$ and treat this degree of freedom as the time variable. A reparameterization invariance under ${\displaystyle \sigma \rightarrow \sigma +\delta \sigma }$ can be imposed with a constraint ${\displaystyle {\mathcal {L}}_{0}=0}$ which we obtain from the metric, i.e.

${\displaystyle {\mathcal {L}}_{0}={\frac {dx_{-}}{d\sigma }}-{\frac {dx_{i}}{d\sigma }}{\frac {dx_{i}}{d\sigma _{0}}}=0.}$

Thus ${\displaystyle x_{-}}$ is not an independent degree of freedom anymore. Now ${\displaystyle {\mathcal {L}}_{0}}$ can be identified as the corresponding Noether charge. Consider ${\displaystyle {\mathcal {L}}_{0}(x_{-},x_{i})}$. Then with the use of the Euler-Lagrange equations for ${\displaystyle x_{i}}$ and ${\displaystyle x_{-}}$ one obtains

${\displaystyle \delta {\mathcal {L}}_{0}={\frac {\partial }{\partial \sigma }}{\bigg (}{\frac {\partial {\mathcal {L}}_{0}}{\partial (\partial x_{i}/\partial \sigma )}}\delta x_{i}+\delta x_{-}{\bigg )}.}$

Equating this to

${\displaystyle \delta {\mathcal {L}}_{0}={\frac {\partial }{\partial \sigma }}(Q\delta \sigma ),}$

where ${\displaystyle Q}$ is the Noether charge, we obtain:

${\displaystyle Q={\frac {\partial {\mathcal {L}}_{0}}{\partial (\partial x_{i}/\partial \sigma )}}{\frac {\delta x_{i}}{\delta \sigma }}+{\frac {\delta x_{-}}{\delta \sigma }}=-{\frac {dx_{i}}{d\sigma _{0}}}{\frac {\delta x_{i}}{\delta \sigma }}+{\frac {\delta x_{-}}{\delta \sigma }}={\mathcal {L}}_{0}.}$

This result agrees with a result cited in the literature.^[1]

• Newman–Penrose formalism

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