Page:The Meaning of Relativity - Albert Einstein (1922).djvu/61

Since the four-dimensional element of volume is an invariant, and ${\displaystyle (K_{1},K_{2},K_{3},K_{4})}$ forms a 4-vector, the four-dimensional integral extended over the shaded portion transforms as a 4-vector, as does also the integral between the limits ${\displaystyle l_{1}}$ and ${\displaystyle l_{2}}$, because the portion of the region which is not shaded contributes nothing to the integral. It follows, therefore, that ${\displaystyle \Delta I_{x},\Delta I_{y},\Delta I_{z},i\Delta E}$ form a 4-vector. Since the quantities themselves transform in the same way as their increments, it follows that the aggregate of the four quantities

has itself the properties of a vector; these quantities are referred to an instantaneous condition of the body (e.g. at the time ${\displaystyle l=l_{1}}$).

This 4-vector may also be expressed in terms of the mass ${\displaystyle m}$, and the velocity of the body, considered as a material particle. To form this expression, we note first, that

is an invariant which refers to an infinitely short portion of the four-dimensional line which represents the motion of the material particle. The physical significance of the invariant ${\displaystyle d\tau }$ may easily be given. If the time axis is chosen in such a way that it has the direction of the line differential which we are considering, or, in other words, if we reduce the material particle to rest, we shall then have ${\displaystyle d\tau =dl}$; this will therefore be measured by the light-seconds clock which is at the same place, and at rest relatively to the material particle. We therefore call4