Ultrarelativistic limit

Very close to the speed of light

In physics, a particle is called ultrarelativistic when its speed is very close to the speed of light c. Notations commonly used are $v\approx c$ or $\beta \approx 1$ or $\gamma \gg 1$ where $\gamma$ is the Lorentz factor, $\beta =v/c$ and $c$ is the speed of light.

The energy of an ultrarelativistic particle is almost completely due to its kinetic energy $E_{k}=(\gamma -1)mc^{2}$ . The total energy can also be approximated as $E=\gamma mc^{2}\approx pc$ where $p=\gamma mv$ is the Lorentz invariant momentum.

This can result from holding the mass fixed and increasing the kinetic energy to very large values or by holding the energy E fixed and shrinking the mass m to very small values which also imply a very large $\gamma$ . Particles with a very small mass do not need much energy to travel at a speed close to c. The latter is used to derive orbits of massless particles such as the photon from those of massive particles (cf. Kepler problem in general relativity). ^{[citation needed]}

Ultrarelativistic approximations

Below are few ultrarelativistic approximations when $\beta \approx 1$ . The rapidity is denoted $w$ :

1-\beta \approx {\frac {1}{2\gamma ^{2}}}

w\approx ln(2\gamma )

Motion with constant proper acceleration: d ≈ e^aτ/(2a), where d is the distance traveled, a = dφ/dτ is proper acceleration (with aτ ≫ 1), τ is proper time, and travel starts at rest and without changing direction of acceleration (see proper acceleration for more details).
Fixed target collision with ultrarelativistic motion of the center of mass: E_CM ≈ √2E₁E₂ where E₁ and E₂ are energies of the particle and the target respectively (so E₁ ≫ E₂), and E_CM is energy in the center of mass frame.

Accuracy of the approximation

For calculations of the energy of a particle, the relative error of the ultrarelativistic limit for a speed v = 0.95c is about 10%, and for v = 0.99c it is just 2%. For particles such as neutrinos, whose γ (Lorentz factor) are usually above 10⁶ (v practically indistinguishable from c), the approximation is essentially exact.

Other limits

The opposite case (v ≪ c) is a so-called classical particle, where its speed is much smaller than c. Its kinetic energy can be approximated by first term of the $\gamma$ binomial series: