Two-Dimensional Energy-Momentum | M.E. Irizarry-Gelpí

Thu 03 November 2016
Physics
#kinematics, #two-dimensional

In two-dimensional spacetime, an energy-momentum vector $P$ has only two components:

$$ P = \begin{pmatrix} E & p \end{pmatrix}. $$

Given an energy-momentum vector $P$, you can compute the $\mathcal{T}$-conjugate:

$$ \mathcal{T}(P) = \begin{pmatrix} -E & p \end{pmatrix}; $$

the $\mathcal{P}$-conjugate:

$$ \mathcal{P}(P) = \begin{pmatrix} E & -p \end{pmatrix}; $$

and the $\mathcal{C}$-conjugate:

$$ \mathcal{C}(P) = \begin{pmatrix} -E & -p \end{pmatrix}. $$

These three operations are involutions:

$$ \mathcal{T}(\mathcal{T}(P)) = P, \qquad \mathcal{P}(\mathcal{P}(P)) = P, \qquad \mathcal{C}(\mathcal{C}(P)) = P. $$

You also have:

$$ \mathcal{C}(P) = \mathcal{T}(\mathcal{P}(P)) = \mathcal{P}(\mathcal{T}(P)) = - P. $$

Let us look at the three kinds of energy-momentum vectors that you can have.

Slow Energy-Momenta

An energy-momentum vector $P$ is slow if it satisfies the equation

$$ -m^{2} = \Vert P \Vert^{2} = -E^{2} + p^{2}, $$

with $m > 0$. You can introduce a slow rapidity variable $\xi$ via

$$ E = m \cosh{(\xi)}, \qquad p = m \sinh{(\xi)}. $$

Here $- \infty < \xi < \infty$. In order to obtain all possible slow energy-momentum vectors, you also need to consider the $\mathcal{T}$-conjugates:

$$ \mathcal{T}(P) = \begin{pmatrix} -m \cosh{(\xi)} & m \sinh{(\xi)} \end{pmatrix}. $$

Note that the $\mathcal{P}$-conjugates correspond to changing the sign of the slow rapidity variable:

$$ \begin{pmatrix} m \cosh{(\xi)} & -m \sinh{(\xi)} \end{pmatrix} = \begin{pmatrix} m \cosh{(-\xi)} & m \sinh{(-\xi)} \end{pmatrix}. $$

The slow speed is defined as

$$ v^{2} \equiv \frac{p^{2}}{E^{2}} = \tanh^{2}{(\xi)}. $$

Since the hyperbolic tangent satisfies

$$ \tanh^{2}{(\xi)} < 1; $$

it follows that the slow speed is bounded from above:

$$ v^{2} < 1. $$

Null Energy-Momenta

An energy-momentum vector $P$ is null if it satisfies the equation

$$ 0 = \Vert P \Vert^{2} = -E^{2} + p^{2}. $$

You can solve this via

$$ E = k, \qquad p = k; $$

with $k > 0$. However, the three conjugates need to be included in order to obtain all possible null vectors:

$$ P, \qquad \mathcal{T}(P), \qquad \mathcal{P}(P), \qquad \mathcal{C}(P). $$

The null speed is defined in the same way as the slow speed:

$$ v^{2} = \frac{p^{2}}{E^{2}}; $$

but since $p^{2} = E^{2}$, the null speed is fixed to a specific value:

$$ v^{2} = 1. $$

Fast Energy-Momenta

An energy-momentum vector $P$ is fast if it satisfies the equation

$$ w^{2} = \Vert P \Vert^{2} = -E^{2} + p^{2}. $$

You can introduce a fast rapidity variable $\rho$ via

$$ E = w \sinh{(\rho)}, \qquad p = w \cosh{(\rho)}. $$

Here $-\infty < \rho < \infty$. In order to obtain all the fast energy-momentum vectors, you also need to consider the $\mathcal{P}$-conjugates:

$$ \mathcal{P}(P) = \begin{pmatrix} w \sinh{(\rho)} & -w \cosh{(\rho)} \end{pmatrix}. $$

Note that the $\mathcal{T}$-conjugates correspond to changing the sign of the fast rapidity variable:

$$ \begin{pmatrix} -w \sinh{(\rho)} & w \cosh{(\rho)} \end{pmatrix} = \begin{pmatrix} w \sinh{(-\rho)} & w \cosh{(-\rho)} \end{pmatrix}. $$

The fast speed is defined in the same way as the slow and null speeds:

$$ v^{2} = \frac{p^{2}}{E^{2}} = \coth^{2}{(\rho)}. $$

Since the hyperbolic cotangent satisfies

$$ \coth^{2}{(\rho)} > 1; $$

the fast speed is bounded from below:

$$ 1 < v^{2}. $$

Invariants

There are six kind of Lorentz invariants that you can construct.

Slow and Slow

If $P_{1}$ and $P_{2}$ are both slow and given by

$$ P_{1} = \begin{pmatrix} m_{1} \cosh{(\xi_{1})} & m_{1} \sinh{(\xi_{1})} \end{pmatrix}, \qquad P_{2} = \begin{pmatrix} m_{2} \cosh{(\xi_{2})} & m_{2} \sinh{(\xi_{2})} \end{pmatrix} $$

with both $m_{1} > 0$ and $m_{2} > 0$, then the inner product is given by

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = -m_{1} m_{2} \left(\cosh{(\xi_{1})} \cosh{(\xi_{2})} - \sinh{(\xi_{1})} \sinh{(\xi_{2})} \right). $$

This is equivalent to

$$ P_{1} \cdot P_{2} = -m_{1} m_{2} \cosh{(\xi_{1} - \xi_{2})}. $$

Since $m_{1}$ and $m_{2}$ are positive, and the hyperbolic cosine is greater or equal to 1, you have

$$ -\frac{P_{1} \cdot P_{2}}{m_{1} m_{2}} \geq 1. $$

Note that

$$ P_{1} \cdot \mathcal{P}(P_{2}) = \mathcal{P}(P_{1}) \cdot P_{2} = -E_{1}E_{2} - p_{1}p_{2} = -m_{1} m_{2} \cosh{(\xi_{1} + \xi_{2})}; $$

as expected from $\mathcal{P}$-conjugation changing the sign of the slow rapidity. Furthermore,

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1}E_{2} + p_{1}p_{2} = m_{1} m_{2} \cosh{(\xi_{1} + \xi_{2})}; $$

and also

$$ P_{1} \cdot \mathcal{C}(P_{2}) = \mathcal{C}(P_{1}) \cdot P_{2} = - P_{1} \cdot P_{2} = m_{1} m_{2} \cosh{(\xi_{1} - \xi_{2})}. $$

Null and Null

If $P_{1}$ and $P_{2}$ are both null and given by

$$ P_{1} = \begin{pmatrix} k_{1} & k_{1} \end{pmatrix}, \qquad P_{2} = \begin{pmatrix} k_{2} & k_{2} \end{pmatrix}; $$

with both $k_{1} > 0$ and $k_{2} > 0$, then the inner product is

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = -k_{1} k_{2} + k_{1} k_{2} = 0. $$

However, you have

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1} E_{2} + p_{1} p_{2} = 2 k_{1} k_{2}; $$

$$ P_{1} \cdot \mathcal{P}(P_{2}) = \mathcal{P}(P_{1}) \cdot P_{2} = -E_{1} E_{2} - p_{1} p_{2} = -2 k_{1} k_{2}; $$

$$ P_{1} \cdot \mathcal{C}(P_{2}) = \mathcal{C}(P_{1}) \cdot P_{2} = E_{1} E_{2} - p_{1} p_{2} = 0. $$

Note that both non-zero invariants are factorizable.

Fast and Fast

If $P_{1}$ and $P_{2}$ are both fast and given by

$$ P_{1} = \begin{pmatrix} w_{1} \sinh{(\rho_{1})} & w_{1} \cosh{(\rho_{1})} \end{pmatrix}, \qquad P_{2} = \begin{pmatrix} w_{2} \sinh{(\rho_{2})} & w_{2} \cosh{(\rho_{2})} \end{pmatrix} $$

with both $w_{1} > 0$ and $w_{2} > 0$, then the inner product is given by

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = -w_{1} w_{2} \left(\sinh{(\rho_{1})} \sinh{(\rho_{2})} - \cosh{(\rho_{1})} \cosh{(\rho_{2})} \right). $$

This is equivalent to

$$ P_{1} \cdot P_{2} = w_{1} w_{2} \cosh{(\rho_{1} - \rho_{2})}. $$

Since $w_{1}$ and $w_{2}$ are positive, and the hyperbolic cosine is greater or equal to 1, you have

$$ \frac{P_{1} \cdot P_{2}}{w_{1} w_{2}} \geq 1. $$

Note that

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1}E_{2} + p_{1}p_{2} = w_{1} w_{2} \cosh{(\rho_{1} + \rho_{2})}; $$

as expected from $\mathcal{T}$-conjugation changing the sign of the fast rapidity. Furthermore,

$$ P_{1} \cdot \mathcal{P}(P_{2}) = \mathcal{P}(P_{1}) \cdot P_{2} = -E_{1}E_{2} - p_{1}p_{2} = -w_{1} w_{2} \cosh{(\rho_{1} + \rho_{2})}; $$

and also

$$ P_{1} \cdot \mathcal{C}(P_{2}) = \mathcal{C}(P_{1}) \cdot P_{2} = - P_{1} \cdot P_{2} = -w_{1} w_{2} \cosh{(\rho_{1} - \rho_{2})}. $$

Slow and Null

If $P_{1}$ is slow and given by

$$ P_{1} = \begin{pmatrix} m_{1} \cosh{(\xi_{1})} & m_{1} \sinh{(\xi_{1})} \end{pmatrix}; $$

and $P_{2}$ is null and given by

$$ P_{2} = \begin{pmatrix} k_{2} & k_{2} \end{pmatrix}; $$

with both $m_{1} > 0$ and $k_{2} > 0$, then the inner product is

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = -m_{1} k_{2} (\cosh{(\xi_{1})} - \sinh{(\xi_{1})}) .$$

This is equivalent to

$$ P_{1} \cdot P_{2} = -m_{1} k_{2} \exp{(-\xi_{1})}. $$

Since $m_{1}$ and $k_{2}$ are positive, and the exponential function is never negative, you have

$$ -\frac{P_{1} \cdot P_{2}}{m_{1} k_{2}} \geq 0 $$

Note that

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1} E_{2} + p_{1} p_{2} = m_{1} k_{2} \exp{(\xi_{1})}. $$

Both of these inner products are factorizable.

Slow and Fast

If $P_{1}$ is slow and given by

$$ P_{1} = \begin{pmatrix} m_{1} \cosh{(\xi_{1})} & m_{1} \sinh{(\xi_{1})} \end{pmatrix} ; $$

and $P_{2}$ is fast and given by

$$ P_{2} = \begin{pmatrix} w_{2} \sinh{(\rho_{2})} & w_{2} \cosh{(\rho_{2})} \end{pmatrix} ; $$

with $m_{1} > 0$ and $w_{2} > 0$, then the inner product is given by

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = -m_{1}w_{2}(\cosh{(\xi_{1})} \sinh{(\rho_{2})} - \sinh{(\xi_{1})} \cosh{(\rho_{2})}). $$

This is equivalent to

$$ P_{1} \cdot P_{2} = m_{1} w_{2} \sinh{(\xi_{1} - \rho_{2})}. $$

Since $m_{1}$ and $w_{2}$ are positive, and the hyperbolic sine takes all values in the real line, you have

$$ -\infty < \frac{P_{1} \cdot P_{2}}{m_{1} w_{2}} < \infty. $$

Note that

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1} E_{2} + p_{1} p_{2} = m_{1} w_{2} \sinh{(\xi_{1} + \rho_{2})}; $$

$$ P_{1} \cdot \mathcal{P}(P_{2}) = \mathcal{P}(P_{1}) \cdot P_{2} = -E_{1} E_{2} - p_{1} p_{2} = -m_{1} w_{2} \sinh{(\xi_{1} + \rho_{2})}; $$

$$ P_{1} \cdot \mathcal{C}(P_{2}) = \mathcal{C}(P_{1}) \cdot P_{2} = E_{1} E_{2} - p_{1} p_{2} = -m_{1} w_{2} \sinh{(\xi_{1} - \rho_{2})}. $$

Null and Fast

If $P_{1}$ is null and given by

$$ P_{1} = \begin{pmatrix} k_{1} & k_{1} \end{pmatrix}; $$

and $P_{2}$ is fast and given by

$$ P_{2} = \begin{pmatrix} w_{2} \sinh{(\rho_{2})} & w_{2} \cosh{(\rho_{2})} \end{pmatrix}; $$

with $k_{1} > 0$ and $w_{2} > 0$, then the inner product is

$$ P_{1} \cdot P_{2} = -E_{1} E_{2} + p_{1} p_{2} = - k_{1} w_{2} (\sinh{(\rho_{2})} - \cosh{(\rho_{2})}) = k_{1} w_{2} \exp{(-\rho_{2})}. $$

Since $k_{1}$ and $w_{2}$ are positive, and the exponential function is never negative, you have

$$ \frac{P_{1} \cdot P_{2}}{k_{1} w_{2}} \geq 0. $$

Note that

$$ P_{1} \cdot \mathcal{T}(P_{2}) = \mathcal{T}(P_{1}) \cdot P_{2} = E_{1} E_{2} + p_{1} p_{2} = k_{1} w_{2} \exp{(\rho_{2})}; $$

$$ P_{1} \cdot \mathcal{P}(P_{2}) = \mathcal{P}(P_{1}) \cdot P_{2} = -E_{1} E_{2} - p_{1} p_{2} = -k_{1} w_{2} \exp{(\rho_{2})}; $$

$$ P_{1} \cdot \mathcal{C}(P_{2}) = \mathcal{C}(P_{1}) \cdot P_{2} = E_{1} E_{2} - p_{1} p_{2} = -k_{1} w_{2} \exp{(-\rho_{2})}. $$

All of these inner products are factorizable.