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chapter 26

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the space-time continuum of the special theory of relativity considered as a euclidean continuum

we are now in a position to formulate more exactly the idea of minkowski, which was only vaguely indicated in section xvii. in accordance with the special theory of relativity, certain co-ordinate systems are given preference for the description of the four-dimensional, space-time continuum. we called these “galileian co-ordinate systems.” for these systems, the four co-ordinates x comma y comma z comma t, which determine an event or—in other words, a point of the four-dimensional continuum—are defined physically in a simple manner, as set forth in detail in the first part of this book. for the transition from one galileian system to another, which is moving uniformly with reference to the first, the equations of the lorentz transformation are valid. these last form the basis for the derivation of deductions from the special theory of relativity, and in themselves they are nothing more than the expression of the universal validity of the law of transmission of light for all galileian systems of reference.

minkowski found that the lorentz transformations satisfy the following simple conditions. let us consider two neighbouring events, the relative position of which in the four-dimensional continuum is given with respect to a galileian reference-body k by the space co-ordinate differences d x comma d y comma d z and the time-difference dt. with reference to a second galileian system we shall suppose that the corresponding differences for these two events are d x superscript prime baseline comma d y superscript prime baseline comma d z superscript prime baseline comma d t prime. then these magnitudes always fulfil the condition1.

d x squared plus d y squared plus d z squared minus c squared d t squared equals d x superscript prime 2 baseline plus d y superscript prime 2 baseline plus d z superscript prime 2 baseline minus c squared d t superscript prime 2 baseline period

the validity of the lorentz transformation follows from this condition. we can express this as follows: the magnitude

d s squared equals d x squared plus d y squared plus d z squared minus c squared d t squared comma

which belongs to two adjacent points of the four-dimensional space-time continuum, has the same value for all selected (galileian) reference-bodies. if we replace x comma y comma z, startroot negative 1 endroot c t, by x 1 comma x 2 comma x 3 comma x 4, we also obtain the result that

d s squared equals d x 1 squared plus d x 2 squared plus d x 3 squared plus d x 4 squared

is independent of the choice of the body of reference. we call the magnitude ds the “distance” apart of the two events or four-dimensional points.

thus, if we choose as time-variable the imaginary variable startroot negative 1 endroot c t instead of the real quantity t, we can regard the space-time continium—accordance with the special theory of relativity—as a “euclidean” four-dimensional continuum, a result which follows from the considerations of the preceding section.

1 cf. appendixes i and ii. the relations which are derived there for the co-ordinates themselves are valid also for co-ordinate differences, and thus also for co-ordinate differentials (indefinitely small differences).

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