Tensors for Physics

18.2 Lorentz-Vectors and Lorentz-Tensors 375

Thus the 4-velocity, divided byc, is a 4-dimensional unit vector. As a consequence,
the4-accelerationdefined by

bi=

dui

dτ

=

d^2 xi

dτ^2

, (18.24)

obeys the relation
uibi=gikuibk= 0 , (18.25)

i.e. the 4-acceleration is orthogonal to the 4-velocity.
The 4-momentumpiof a particle with the restm,is

pi=mui. (18.26)

The first three components ofpiare equal to

pμ=m(v)vμ,

where the effective massm(v)is defined by

m(v):=γm=

m

√

1 −v^2 /c^2

. (18.27)

Here, the variablevoccurring inγis the magnitude of the velocityvof the moving
particle, as seen from the rest frame. The fourth component ofpiis equal to the
energyEof a free particle moving with speedv, divided byc,viz.

p^0 =m(v)c=

E

c

,

where

E:=m(v)c^2 =

mc^2

√

1 −v^2 /c^2

. (18.28)

The pertaining kinetic energy is

Ekin=E−mc^2 =mc^2

(

1

√

1 −v^2 /c^2

− 1

)

.

In the limitvc, this expression reduces to the non-relativistic limitEkin=^12 mv^2.