Curvature effects in special relativity
摘要
Space-time measurements, of gedanken experiments of special relativity need modification in curved spaces-times. It is found that in a space-time with metric , the special relativistic factor , has to be replaced by , where , is the 4-velocity, and the relative velocity between the two frames. Examples are given for Schwarzschild metric, Friedmann-Robertson-Walker metric, and the G\"{o}del metric. Among the novelties are paradoxical tachyonic states, with becoming imaginary, for velocities less than that of light, due to space-time curvature. Relativistic mass becomes a function of space-time curvature, , where is the 4-momentum, signalling a new form of mach's principle, in which a global object - namely the metric tensor, is effecting interia.
引用
@article{arxiv.physics/0412165,
title = {Curvature effects in special relativity},
author = {Moninder Singh Modgil},
journal= {arXiv preprint arXiv:physics/0412165},
year = {2007}
}
备注
13 pages (double spaced)