Physics Asked by Rich Piana on April 9, 2021
We know that the Lagrangian of a relativistic particle is as follows: $$L = -mc^2sqrt{1-(v/c)^2},$$ with the action being the integral of this Lagrangian with respect to time in the reference frame of the particle. My question is, does the action rely on a particular choice of the inertial frame?
No, the action $S=-E_0tau$ is minus the rest energy $E_0=m_0c^2$ times the lapse $tau$ of proper time of the massive particle. Both factors $E_0$ and $tau$ are invariants, so the action $S$ is independent of the choice of coordinate system. See also this related Phys.SE post.
Answered by Qmechanic on April 9, 2021
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