In special relativity, the classical concept of velocity is converted to rapidity to accommodate the limit determined by the speed of light. Velocities must be combined by Einstein's velocity-addition formula. For low speeds, rapidity and velocity are almost exactly proportional but, for higher velocities, rapidity takes a larger value, with the rapidity of light being infinite.

Mathematically, rapidity can be defined as the hyperbolic angle that differentiates two frames of reference in relative motion, each frame being associated with distance and time coordinates.

Using the inverse hyperbolic function artanh, the rapidity w corresponding to velocity v is w = artanh(v/c) where c is the speed of light. For low speeds, by the small-angle approximation, w is approximately v / c. Since in relativity any velocity v is constrained to the interval −c < v < c the ratio v / c satisfies −1 < v / c < 1. The inverse hyperbolic tangent has the unit interval (−1, 1) for its domain and the whole real line for its image; that is, the interval −c < v < c maps onto −∞ < w < ∞.

In 1908 Hermann Minkowski explained how the Lorentz transformation could be seen as simply a hyperbolic rotation of the spacetime coordinates, i.e., a rotation through an imaginary angle.^[1] This angle therefore represents (in one spatial dimension) a simple additive measure of the velocity between frames.^[2] The rapidity parameter replacing velocity was introduced in 1910 by Vladimir Varićak^[3] and by E. T. Whittaker.^[4] The parameter was named rapidity by Alfred Robb (1911)^[5] and this term was adopted by many subsequent authors, such as Ludwik Silberstein (1914), Frank Morley (1936) and Wolfgang Rindler (2001).

The quadrature of the hyperbola xy = 1 by Grégoire de Saint-Vincent established the natural logarithm as the area of a hyperbolic sector or an equivalent area against an asymptote. In spacetime theory, the connection of events by light divides the universe into Past, Future, or Elsewhere based on a Here and Now ^{[clarification needed]}. On any line in space, a light beam may be directed left or right. Take the x-axis as the events passed by the right beam and the y-axis as the events of the left beam. Then a resting frame has time along the diagonal x = y. The rectangular hyperbola xy = 1 can be used to gauge velocities (in the first quadrant). Zero velocity corresponds to (1, 1). Any point on the hyperbola has light-cone coordinates ${\displaystyle (e^{w},\ e^{-w})}$ where w is the rapidity, and is equal to the area of the hyperbolic sector from (1, 1) to these coordinates. Many authors refer instead to the unit hyperbola ${\displaystyle x^{2}-y^{2}}$, using rapidity for a parameter, as in the standard spacetime diagram. There the axes are measured by clock and meter-stick, more familiar benchmarks, and the basis of spacetime theory. So the delineation of rapidity as a hyperbolic parameter of beam-space is a reference^{[clarification needed]} to the seventeenth-century origin of our precious transcendental functions, and a supplement to spacetime diagramming.

The rapidity w arises in the linear representation of a Lorentz boost as a vector-matrix product $${\displaystyle {\begin{pmatrix}ct'\\x'\end{pmatrix}}={\begin{pmatrix}\cosh w&-\sinh w\\-\sinh w&\cosh w\end{pmatrix}}{\begin{pmatrix}ct\\x\end{pmatrix}}=\mathbf {\Lambda } (w){\begin{pmatrix}ct\\x\end{pmatrix}}.}$$

The matrix Λ(w) is of the type ${\displaystyle {\begin{pmatrix}p&q\\q&p\end{pmatrix}}}$ with p and q satisfying p² – q² = 1, so that (p, q) lies on the unit hyperbola. Such matrices form the indefinite orthogonal group O(1,1) with one-dimensional Lie algebra spanned by the anti-diagonal unit matrix, showing that the rapidity is the coordinate on this Lie algebra. This action may be depicted in a spacetime diagram. In matrix exponential notation, Λ(w) can be expressed as ${\displaystyle \mathbf {\Lambda } (w)=e^{\mathbf {Z} w}}$, where Z is the negative of the anti-diagonal unit matrix $${\displaystyle \mathbf {Z} ={\begin{pmatrix}0&-1\\-1&0\end{pmatrix}}.}$$

A key property of the matrix exponential is ${\displaystyle e^{\mathbf {X} (s+t)}=e^{\mathbf {X} s}e^{\mathbf {X} t}}$ from which immediately follows that $${\displaystyle \mathbf {\Lambda } (w_{1}+w_{2})=\mathbf {\Lambda } (w_{1})\mathbf {\Lambda } (w_{2}).}$$ This establishes the useful additive property of rapidity: if A, B and C are frames of reference, then $${\displaystyle w_{\text{AC}}=w_{\text{AB}}+w_{\text{BC}},}$$ where w_PQ denotes the rapidity of a frame of reference Q relative to a frame of reference P. The simplicity of this formula contrasts with the complexity of the corresponding velocity-addition formula.

As we can see from the Lorentz transformation above, the Lorentz factor identifies with cosh w $${\displaystyle \gamma ={\frac {1}{\sqrt {1-v^{2}/c^{2}}}}\equiv \cosh w,}$$ so the rapidity w is implicitly used as a hyperbolic angle in the Lorentz transformation expressions using γ and β. We relate rapidities to the velocity-addition formula $${\displaystyle u={\frac {u_{1}+u_{2}}{1+{\frac {u_{1}u_{2}}{c^{2}}}}}}$$ by recognizing $${\displaystyle \beta _{i}={\frac {u_{i}}{c}}=\tanh {w_{i}}}$$ and so $${\displaystyle \tanh w={\frac {\tanh w_{1}+\tanh w_{2}}{1+\tanh w_{1}\tanh w_{2}}}=\tanh(w_{1}+w_{2})}$$

Proper acceleration (the acceleration 'felt' by the object being accelerated) is the rate of change of rapidity with respect to proper time (time as measured by the object undergoing acceleration itself). Therefore, the rapidity of an object in a given frame can be viewed simply as the velocity of that object as would be calculated non-relativistically by an inertial guidance system on board the object itself if it accelerated from rest in that frame to its given speed.

The product of β and γ appears frequently, and is from the above arguments $${\displaystyle \beta \gamma =\tanh w\cosh w=\sinh w}$$

From the above expressions we have $${\displaystyle e^{w}=\gamma (1+\beta )=\gamma \left(1+{\frac {v}{c}}\right)={\sqrt {\frac {1+{\tfrac {v}{c}}}{1-{\tfrac {v}{c}}}}},}$$ and thus $${\displaystyle e^{-w}=\gamma (1-\beta )=\gamma \left(1-{\frac {v}{c}}\right)={\sqrt {\frac {1-{\tfrac {v}{c}}}{1+{\tfrac {v}{c}}}}}.}$$ or explicitly $${\displaystyle w=\ln \left[\gamma (1+\beta )\right]=-\ln \left[\gamma (1-\beta )\right]\,.}$$

The Doppler-shift factor associated with rapidity w is ${\displaystyle k=e^{w}}$.

The energy E and scalar momentum |p| of a particle of non-zero (rest) mass m are given by: $${\displaystyle {\begin{aligned}E&=\gamma mc^{2}\\\left|\mathbf {p} \right|&=\gamma mv.\end{aligned}}}$$ With the definition of w $${\displaystyle w=\operatorname {artanh} {\frac {v}{c}},}$$ and thus with $${\displaystyle \cosh w=\cosh \left(\operatorname {artanh} {\frac {v}{c}}\right)={\frac {1}{\sqrt {1-{\frac {v^{2}}{c^{2}}}}}}=\gamma }$$ $${\displaystyle \sinh w=\sinh \left(\operatorname {artanh} {\frac {v}{c}}\right)={\frac {\frac {v}{c}}{\sqrt {1-{\frac {v^{2}}{c^{2}}}}}}=\beta \gamma ,}$$ the energy and scalar momentum can be written as: $${\displaystyle {\begin{aligned}E&=mc^{2}\cosh w\\\left|\mathbf {p} \right|&=mc\,\sinh w.\end{aligned}}}$$

So, rapidity can be calculated from measured energy and momentum by $${\displaystyle w=\operatorname {artanh} {\frac {|\mathbf {p} |c}{E}}={\frac {1}{2}}\ln {\frac {E+|\mathbf {p} |c}{E-|\mathbf {p} |c}}=\ln {\frac {E+|\mathbf {p} |c}{mc^{2}}}~.}$$

However, experimental particle physicists often use a modified definition of rapidity relative to a beam axis $${\displaystyle y={\frac {1}{2}}\ln {\frac {E+p_{z}c}{E-p_{z}c}},}$$ where p_z is the component of momentum along the beam axis.^[6] This is the rapidity of the boost along the beam axis which takes an observer from the lab frame to a frame in which the particle moves only perpendicular to the beam. Related to this is the concept of pseudorapidity.

Rapidity relative to a beam axis can also be expressed as $${\displaystyle y=\ln {\frac {E+p_{z}c}{\sqrt {m^{2}c^{4}+p_{T}^{2}c^{2}}}}~.}$$

• Bondi k-calculus
• Lorentz transformation
• Pseudorapidity
• Proper velocity
• Theory of relativity

• Vladimir Varićak (1910, 1912, 1924), see Vladimir Varićak#Publications
• Whittaker, Edmund Taylor (1910). A History of the Theories of Aether and Electricity. p. 441.
• Robb, Alfred (1911). Optical geometry of motion, a new view of the theory of relativity. Cambridge: Heffner & Sons.
• Émile Borel (1913), La théorie de la relativité et la cinématique (in French), Comptes rendus de l'Académie des Sciences, Paris: volume 156, pages 215–218; volume 157, pages 703–705
• Silberstein, Ludwik (1914). The Theory of Relativity. London: Macmillan & Co. p. 179.
• Vladimir Karapetoff (1936), "Restricted relativity in terms of hyperbolic functions of rapidities", American Mathematical Monthly, volume 43, page 70.
• Frank Morley (1936), "When and Where", The Criterion, edited by Thomas Stearns Eliot, volume 15, pages 200–209.
• Wolfgang Rindler (2001) Relativity: Special, General, and Cosmological, page 53, Oxford University Press.
• Shaw, Ronald (1982) Linear Algebra and Group Representations, volume 1, page 229, Academic Press ISBN 0-12-639201-3.
• Walter, Scott (1999). "The non-Euclidean style of Minkowskian relativity" (PDF). In Jeremy John Gray (ed.). The Symbolic Universe: Geometry and Physics. Oxford University Press. pp. 91–127. Archived from the original (PDF) on 2013-10-16. Retrieved 2009-01-08.(see page 17 of e-link)
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• Jackson, John David (1999) [1962]. "Chapter 11". Classical Electrodynamics (3rd ed.). John Wiley & Sons. ISBN 0-471-30932-X.