Abstract
Today's physics claims as an undisputed fact that the Lorenz's transformations x'=(x–v.t)/b ; t'=(t–v.x/c2)/b (point
of view K', where b=(1-v2/c2)1/2) they
speak of inseparable interweaving of spatial coordinates and time. Here I show the
insolvency of this thesis. For this purpose, I make a simple
comparison between the quantities of "length" and
"time" on the one hand and their dimensions
"meter" and "second" on the other, with the result: length=(number).(meter)
; time=(number).(second). Therefore, in order to interlace the length and time, it
is necessary to interlace the meter and the second or the numbers in front of
them (there is no another for interlacement). And since the numbers cannot interlace, I show that between
the meter (m', m) and second (s', s) also had no interlacing: m'=(m–m.s/s)/b or m'=(m–m)/b ; s'=[s–(m.m/s)/(m2/s2)]/b or s'=(s–s)/b (Principle of opposite=Principle
of determination).
