5.5 The lorentz transformation (Page 2/12)

University physics volume 3 Page 2 / 12

The lorentz transformation equations

The Galilean transformation nevertheless violates Einstein’s postulates, because the velocity equations state that a pulse of light moving with speed c along the x -axis would travel at speed $c - v$ in the other inertial frame. Specifically, the spherical pulse has radius $r = c t$ at time t in the unprimed frame, and also has radius $r' = c t'$ at time $t'$ in the primed frame. Expressing these relations in Cartesian coordinates gives

\begin{matrix} x^{2} + y^{2} + z^{2} - c^{2} t^{2} & = & 0 \\ {x^{'}}^{2} + {y^{'}}^{2} + {z^{'}}^{2} - c^{2} {t^{'}}^{2} & = & 0 . \end{matrix}

The left-hand sides of the two expressions can be set equal because both are zero. Because $y = y'$ and $z = z',$ we obtain

x^{2} - c^{2} t^{2} = {x^{'}}^{2} - c^{2} {t^{'}}^{2} .

This cannot be satisfied for nonzero relative velocity v of the two frames if we assume the Galilean transformation results in $t = t'$ with $x = x' + v t' .$

To find the correct set of transformation equations, assume the two coordinate systems S and $S'$ in [link] . First suppose that an event occurs at $(x', 0, 0, t')$ in $S'$ and at $(x, 0, 0, t)$ in S , as depicted in the figure.

The axes of frames S and S prime are shown. S has axes x, y, and z. S prime is moving to the right with velocity v and has axes x prime, y prime and z prime. S and S prime are aligned along the horizontal x and x prime axes and are separated by a distance v t. An event on the horizontal x and x prime axes is indicated by a point which is a distance x from the y z plane of the S frame and a distance x prime from the y prime, z prime plane of the S prime frame. — An event occurs at ( x , 0, 0, t ) in S and at $(x', 0, 0, t')$ in $S' .$ The Lorentz transformation equations relate events in the two systems.

Suppose that at the instant that the origins of the coordinate systems in S and $S'$ coincide, a flash bulb emits a spherically spreading pulse of light starting from the origin. At time t , an observer in S finds the origin of $S'$ to be at $x = v t .$ With the help of a friend in S , the $S'$ observer also measures the distance from the event to the origin of $S'$ and finds it to be $x' \sqrt{1 - v^{2} / c^{2}} .$ This follows because we have already shown the postulates of relativity to imply length contraction. Thus the position of the event in S is

x = v t + x' \sqrt{1 - v^{2} / c^{2}}

and

x' = \frac{x - v t}{\sqrt{1 - v^{2} / c^{2}}} .

The postulates of relativity imply that the equation relating distance and time of the spherical wave front:

x^{2} + y^{2} + z^{2} - c^{2} t^{2} = 0

must apply both in terms of primed and unprimed coordinates, which was shown above to lead to [link] :

x^{2} - c^{2} t^{2} = x'^{2} - c^{2} t'^{2} .

We combine this with the equation relating x and $x'$ to obtain the relation between t and $t' :$

t' = \frac{t - v x / c^{2}}{\sqrt{1 - v^{2} / c^{2}}} .

The equations relating the time and position of the events as seen in S are then

\begin{matrix} t & = & \frac{t' + v x' / c^{2}}{\sqrt{1 - v^{2} / c^{2}}} \\ x & = & \frac{x' + v t'}{\sqrt{1 - v^{2} / c^{2}}} \\ y & = & y' \\ z & = & z' . \end{matrix}

This set of equations, relating the position and time in the two inertial frames, is known as the Lorentz transformation . They are named in honor of H.A. Lorentz (1853–1928), who first proposed them. Interestingly, he justified the transformation on what was eventually discovered to be a fallacious hypothesis. The correct theoretical basis is Einstein’s special theory of relativity.

The reverse transformation expresses the variables in S in terms of those in $S' .$ Simply interchanging the primed and unprimed variables and substituting gives:

\begin{matrix} t' & = & \frac{t - v x / c^{2}}{\sqrt{1 - v^{2} / c^{2}}} \\ x' & = & \frac{x - v t}{\sqrt{1 - v^{2} / c^{2}}} \\ y' & = & y \\ z' & = & z . \end{matrix}

Using the lorentz transformation for time

Spacecraft

S'

is on its way to Alpha Centauri when Spacecraft S passes it at relative speed c /2. The captain of

S'

sends a radio signal that lasts 1.2 s according to that ship’s clock. Use the Lorentz transformation to find the time interval of the signal measured by the communications officer of spaceship S .

Solution

Identify the known: $Δ t' = t_{2}' - t_{1}' = 1.2 s; Δ x' = x'_{2} - x'_{1} = 0 .$
Identify the unknown: $Δ t = t_{2} - t_{1} .$
Express the answer as an equation. The time signal starts as $(x', t_{1}')$ and stops at $(x', t_{2}') .$ Note that the $x'$ coordinate of both events is the same because the clock is at rest in $S' .$ Write the first Lorentz transformation equation in terms of $Δ t = t_{2} - t_{1},$ $Δ x = x_{2} - x_{1},$ and similarly for the primed coordinates, as:

$Δ t = \frac{Δ t' + v Δ x' / c^{2}}{\sqrt{1 - \frac{v^{2}}{c^{2}}}} .$

Because the position of the clock in $S'$ is fixed, $Δ x' = 0,$ and the time interval $Δ t$ becomes:

$Δ t = \frac{Δ t'}{\sqrt{1 - \frac{v^{2}}{c^{2}}}} .$
Do the calculation.
With $Δ t' = 1.2 s$ this gives:

$Δ t = \frac{1.2 s}{\sqrt{1 - {(\frac{1}{2})}^{2}}} = 1.6 s.$

Note that the Lorentz transformation reproduces the time dilation equation.

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Source: OpenStax, University physics volume 3. OpenStax CNX. Nov 04, 2016 Download for free at http://cnx.org/content/col12067/1.4

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