Inertial Transformations and the Nonexistence of Tachyons for Spacetime Dimension Greater than Two

Abstract

We consider real linear transformations between two inertial frames with constant relative speed v in a d-dimensional spacetime where light moves with constant speed c=1 (for some chosen units) in all frames. For d=2 we show that the standard relative velocity formula holds and that any associated anisotropic conformal factor is multiplicative under composition of inertial transformations for |v|≠ 1. Assuming that the inertial transformation matrix is continuous in a neighbourhood of v=0 and differentiable at v=0, we determine the conformal factor for all |v|≠ 1. For an isotropic spacetime, the general solution reduces to the standard d=2 Lorentz transformation for |v|<1 or to a Tachyonic transformation for |v|>1, first described by Parker in 1969. For d>2 we show that no Tachyonic-like inertial transformations exist which are compatible with constant light speed.

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